Answer: To find the total amount of sugar required to make the banana pudding, we need to add the amount of sugar needed for the flour mixture to the amount of sugar needed for the meringue topping.
The recipe calls for 2/3 of a cup of sugar for the flour mixture and 1/4 of a cup of sugar for the meringue topping. To add these two fractions, we need to find a common denominator. The least common multiple of 3 and 4 is 12, so we can convert these fractions to twelfths:
2/3 = 8/12
1/4 = 3/12
Now we can add these two fractions:
8/12 + 3/12 = 11/12
So the total amount of sugar required to make the banana pudding is 11/12 of a cup.
Si hoy es martes que día sera dentro de 300 días
Answer:
Si hoy es martes en 300 días será lunes.
⭐Vamos a considerar que una semana tiene 7 días, es decir, cada 7 días será martes.
Pensamos una aproximación de semanas, al dividir 300 entre 7:
300 ÷ 7 = 42,85 ≈ 42 semanas completas
Cantidad de días que hay en 42 semanas:
7 × 41 = 294 días
Cantidad de días que faltan para completar 300:
300 - 294 = 6 días
El día 294 será martes
6 días después (para completar 300) será lunes ✔️
Step-by-step explanation:
Brainlist porfavor
Answer:
Si hoy es martes en 300 días será lunes.
Plot the points A(-2,1), B(-6, -9), C(-1, -11) on the coordinate axes below. State the
coordinates of point D such that A, B, C, and D would form a rectangle. (Plotting
point D is optional.)
The value of the coordinates of point D is, (3, - 1)
We have to given that;
All the coordinates of rectangles are,
A(-2,1), B(-6, -9), C(-1, -11)
Now, Let the fourth coordinate of rectangle is,
D (x, y)
Hence, Midpoint of AC and BD are same.
So., Midpoint of AC is,
⇒ AC = (- 2 + (- 1))/ 2, (1 + (- 11))/2
= (- 3/2 , - 5)
And, Midpoint of BD,
⇒ BD = (- 6 + x)/2, (- 9 + y)/2
By comparing;
⇒ (- 6 + x)/2 = - 3/2
⇒ - 6 + x = - 3
⇒ x = - 3 + 6
⇒ x = 3
⇒ (- 9 + y)/2 = - 5
⇒ - 9 + y = - 10
⇒ y = -10 + 9
⇒ y = - 1
Thus, The value of the coordinates of point D is, (3, - 1)
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Evaluate the following indefinite integral si 3x^2 – 3x +1/ x^3 + 2
To evaluate the indefinite integral of 3x^2 – 3x +1/ x^3 + 2, we can use partial fraction decomposition.
First, we factor the denominator: x^3 + 2 = (x + ∛2)(x^2 – ∛2x + 2).
Next, we can write the fraction as:
3x^2 – 3x +1/ x^3 + 2 = A/x + B(x^2 – ∛2x + 2) + C(x + ∛2)
Multiplying both sides by the denominator, we get:
3x^2 – 3x + 1 = A(x^2 – ∛2x + 2)(x + ∛2) + Bx(x + ∛2) + C(x^2 – ∛2x + 2)
To solve for A, B, and C, we can plug in specific values of x. For example, if we plug in x = -∛2, we get:
-2√2 + 1 = A(4√2) + C(0)
Therefore, A = (2 – √2)/8.
If we plug in x = 0, we get:
1 = A(2√2) + B(0) + C(√2)
Therefore, C = 1/√2.
Finally, if we plug in x = 1, we get:
1 = A(3√2) + B(1 – √2) + C(1 + √2)
Therefore, B = (-1 + √2)/4.
Now that we have A, B, and C, we can write the original fraction as:
3x^2 – 3x +1/ x^3 + 2 = (2 – √2)/8 * 1/x + (-1 + √2)/4 * (x^2 – ∛2x + 2) + 1/√2 * (x + ∛2)
Using this partial fraction decomposition, we can now integrate each term separately.
Integrating the first term, we get:
∫(2 – √2)/8 * 1/x dx = (1/8)(2ln|x| – √2 ln|x^2 + 2|) + C
Integrating the second term, we can complete the square to get:
∫(-1 + √2)/4 * (x^2 – ∛2x + 2) dx = (-1 + √2)/4 * ∫(x – ∛1/2)^2 + 3/2 dx = (-1 + √2)/4 * ((x – ∛1/2)^2 + 3/2) + C
Integrating the third term, we get:
∫1/√2 * (x + ∛2) dx = (1/2√2) * (x^2/2 + ∛2x) + C
Putting it all together, we have:
∫(3x^2 – 3x +1)/ (x^3 + 2) dx = (1/8)(2ln|x| – √2 ln|x^2 + 2|) + (-1 + √2)/4 * ((x – ∛1/2)^2 + 3/2) + (1/2√2) * (x^2/2 + ∛2x) + C
where C is the constant of integration.
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3 square root y to the second power
The expression for the given statement is √3².
We have,
The expression that can be written from the statement.
3 square root = √3
Second power of x = x²
Now,
We can write the expression as,
= √3²
Thus,
The expression for the given statement is √3².
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an airplane is 58 m long. a scale model of the plane is 40.6 cm long.
determine the scale factor used to create the model as a decimal rounded
to the nearest thousandth
If a scale model of the plane is 40.6 cm long, the scale factor used to create the model is approximately 1:142.857 or 0.007 rounded to the nearest thousandth.
To determine the scale factor used to create the model, we need to divide the length of the actual airplane by the length of the model airplane:
58 m / 40.6 cm
To perform this calculation, we need to convert the units so that they match. We can convert 58 m to cm by multiplying by 100:
58 m = 58 × 100 cm = 5800 cm
Now we can divide:
5800 cm / 40.6 cm = 142.857...
Rounding to the nearest thousandth, we get:
142.857... ≈ 142.857
Therefore, the scale factor used to create the model is approximately 1:142.857 or 0.007 rounded to the nearest thousandth.
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A scientist uses a submarine to study ocean life.
She begins at sea level, which is an elevation of o feet.
She travels straight down for 41 seconds at a speed of 4.9 feet per second.
• She then ascends for 49 seconds at a speed of 3.2 feet per second.
●
After this 90-second period, how much time, in seconds, will it take for the scientist
to travel back to sea level at 3.6 feet per second? If necessary, round your answer to
the nearest tenth of a second.
After these 90 seconds, the time, in seconds, that it will take for the scientist to travel back to sea level at 3.6 feet per second is 12.3 seconds, rounded to the nearest tenth of a second.
How the time is determined:The descent rate = 4.9 feet per second
The descent time = 41 seconds
The total descent distance = 200.9 feet (4.9 x 41)
The ascent rate = 3.2 feet per second
The ascent time = 49 seconds
The total ascent distance traveled = 156.8 feet (3.2 x 49)
The difference between descent and ascent distances = 44.1 feet (200.9 - 156.8)
Traveling speed to sea level = 3.6 feet per second
The time to be taken to travel to sea level = 12.25 (44.1 ÷ 3.6)
= 12.3 seconds
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Twenty-four pairs of adult brothers and sisters were sampled at random from a population. The difference in heights, recorded in inches (brother’s height minus sister’s height), was calculated for each pair. The 95% confidence interval for the mean difference in heights for all brother-and-sister pairs in this population was (–0. 76, 4. 34). What was the sample mean difference from these 24 pairs of siblings?
–0. 76 inches
0 inches
1. 79 inches
4. 34 inches
The sample mean difference in heights for these 24 pairs of siblings is 1.79 inches. So the third option is correct.
The 95% confidence interval for the mean difference in heights for all brother-and-sister pairs in the population was (–0.76, 4.34).
This means that if we were to repeat this sampling process many times, we would expect 95% of the resulting confidence intervals to contain the true mean difference in heights for all brother-and-sister pairs in the population.
To find the sample mean difference from these 24 pairs of siblings, we take the midpoint of the confidence interval. The midpoint is the average of the lower and upper bounds, which is:
(-0.76 + 4.34) / 2 = 1.79
Therefore, the sample mean difference in heights for these 24 pairs of siblings is 1.79 inches.
So the correct answer is third option.
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Calculate the accumulated amount in each investment after 40 years. Using a TVM solver
a. $150 invested on the first day of each month at 6% compounded monthly.
b. $900 invested on January 1st and on July 1st at 4% compounded semi-annually.
c. $450 invested on January 1st, April 1st, July 1st, and October 1st at 5% compounded quarterly.
Answer: a. Using a TVM solver with the following inputs:
Present value (PV) = 150
Interest rate (I/Y) = 6/12 = 0.5 (monthly interest rate)
Number of periods (N) = 40 years x 12 months/year = 480
Payment (PMT) = -150 (negative because it's an outgoing cash flow at the beginning of each month)
Compounding frequency (C/Y) = 12 (monthly compounding frequency)
We get an accumulated amount (FV) of $222,812.64.
b. Using a TVM solver with the following inputs:
Present value (PV) = 900
Interest rate (I/Y) = 4/2 = 2 (semi-annual interest rate)
Number of periods (N) = 40 years x 2 semi-annual periods/year = 80
Payment (PMT) = 0 (because there are no regular payments)
Compounding frequency (C/Y) = 2 (semi-annual compounding frequency)
We get an accumulated amount (FV) of $3,054.58.
c. Using a TVM solver with the following inputs:
Present value (PV) = 450
Interest rate (I/Y) = 5/4 = 1.25 (quarterly interest rate)
Number of periods (N) = 40 years x 4 quarterly periods/year = 160
Payment (PMT) = 0 (because there are no regular payments)
Compounding frequency (C/Y) = 4 (quarterly compounding frequency)
We get an accumulated amount (FV) of $2,109.64.
Step-by-step explanation: can i get brainliest :D
To calculate the accumulated amount in each investment after 40 years, we can use the TVM solver. For each investment, use the appropriate formula to calculate the accumulated amount by plugging in the given values of principal amount, interest rate, number of times interest is compounded per year, and number of years. Finally, calculate the accumulated amount to find the answer.
Explanation:a. To calculate the accumulated amount in the first investment, $150 invested on the first day of each month at 6% compounded monthly for 40 years, you can use the formula:
Let P be the principal amount: $150Let r be the annual interest rate: 6% or 0.06Let n be the number of times interest is compounded per year: 12 (monthly)Let t be the number of years: 40Use the formula A = P(1 + r/n)^nt to calculate the accumulated amount:A = 150(1 + 0.06/12)^(12*40)
A=1643.61
b. To calculate the accumulated amount in the second investment, $900 invested on January 1st and July 1st at 4% compounded semi-annually for 40 years, you can use the formula:
Let P be the principal amount: $900Let r be the annual interest rate: 4% or 0.04Let n be the number of times interest is compounded per year: 2 (semi-annually)Let t be the number of years: 40Use the formula A = P(1 + r/n)^(2*t) to calculate the accumulated amount:A = 900(1 + 0.04/2)^(2*40)
A=4387.89
c. To calculate the accumulated amount in the third investment, $450 invested on January 1st, April 1st, July 1st, and October 1st at 5% compounded quarterly for 40 years, you can use the formula:
Let P be the principal amount: $450Let r be the annual interest rate: 5% or 0.05Let n be the number of times interest is compounded per year: 4 (quarterly)Let t be the number of years: 40Use the formula A = P(1 + r/n)^(n*t) to calculate the accumulated amount:A = 450(1 + 0.05/4)^(4*40)
A=3284.11
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Show that p(0,7), q(6,5), r(5,2) and s(-1,4) are the vertices of rectangular
Answer:
Step-by-step explanation:
P(0,7), Q(6,5), R(5,2), and S(-1,4) form the vertices of a rectangle. To prove this, we need to show that the opposite sides of the quadrilateral are parallel and that the diagonals are equal in length and bisect each other.
To explain this solution in more detail, we can start by finding the slopes of the line segments connecting each pair of points. The slope of a line segment can be calculated using the formula:
slope = (change in y) / (change in x)
For example, the slope of the line segment connecting P and Q is:
slope PQ = (5 - 7) / (6 - 0) = -2/6 = -1/3
We can calculate the slopes of the other line segments in a similar way. If the opposite sides of the quadrilateral are parallel, then their slopes must be equal. We can check that this is true for all pairs of opposite sides:
slope PQ = -1/3, slope SR = -1/3
slope QR = (2 - 5) / (5 - 6) = -3/-1 = 3, slope PS = (4 - 7) / (-1 - 0) = -3/-1 = 3
Next, we can calculate the lengths of the diagonals using the distance formula:
distance PR = sqrt[(5 - 0)^2 + (2 - 7)^2] = sqrt(5^2 + (-5)^2) = sqrt(50)
distance QS = sqrt[(6 - (-1))^2 + (5 - 4)^2] = sqrt(7^2 + 1^2) = sqrt(50)
If the diagonals are equal in length, then we should have distance PR = distance QS, which is indeed the case.
Finally, we need to show that the diagonals bisect each other. This means that the midpoint of PR should be the same as the midpoint of QS. We can calculate the midpoint of each diagonal using the midpoint formula:
midpoint of PR = [(0 + 5)/2, (7 + 2)/2] = (2.5, 4.5)
midpoint of QS = [(6 + (-1))/2, (5 + 4)/2] = (2.5, 4.5)
Since the midpoints are the same, we have shown that the diagonals bisect each other.
Therefore, we have shown that the points P(0,7), Q(6,5), R(5,2), and S(-1,4) form the vertices of a rectangle.
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The table shows the amount of rainfall, in cm, that fell each day for 30 days.
Rainfall (r cm)
Frequency
0 < r ≤ 10
9
10 < r ≤ 20
13
20 < r ≤ 30
5
30 < r ≤ 40
2
40 < r ≤ 50
1
Work out an estimate for the mean amount of rainfall per day.
Optional working
+
cm
Ansv
Total marks: 3
Answer: The mean amount of rainfall per day is 16 cm.
Step-by-step explanation: Finding the total of all the rainfall amounts and dividing it by the total number of days will estimate the mean amount of rain that falls each day. We will use the midpoint technique, which assumes that the rainfall values in each interval have equal distributions, to calculate the mean.
Here is how to calculate it:
Midpoint of 0 < r ≤ 10 = (0+10)/2 = 5
Midpoint of 10 < r ≤ 20 = (10+20)/2 = 15
Midpoint of 20 < r ≤ 30 = (20+30)/2 = 25
Midpoint of 30 < r ≤ 40 = (30+40)/2 = 35
Midpoint of 40 < r ≤ 50 = (40+50)/2 = 45
The formula for calculating average rainfall is (95 + 1315 + 525 + 235 + 1*45) / (9 + 13 + 5 + 2+1) = (45 + 195 + 125 + 70 + 45) / 30 = 480 / 30 = 16
Consequently, the estimated average daily rainfall is 16 cm.
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Find the volume of the solid generated by revolving the region bounded by the curve y=7secx and the line y=72 over the interval − π 4≤x≤ π 4 about the x-axis.
To find the volume of the solid generated by revolving the region bounded by the curve y=7secx and the line y=72 over the interval − π/4≤x≤π/4 about the x-axis, we can use the method of cylindrical shells.
First, we need to find the equation of the curve of the region being revolved. We have y=7secx and y=72, so at the intersection point, we have 7secx=72, which gives us secx=10.285. Taking the inverse secant function of both sides, we get x=1.37 (approximately).
Now, we can set up the integral for the volume using cylindrical shells. The radius of each shell is y-72, and the height of each shell is 2π times the distance from x to the intersection point, which is x-1.37. The integral is:
V = ∫(2π)(y-72)(x-1.37) dx, from -π/4 to π/4
We can substitute y=7secx into the integral:
V = ∫(2π)(7secx-72)(x-1.37) dx, from -π/4 to π/4
Using integration by parts, we can evaluate the integral:
V = (2π)[(7/2)ln|secx+tanx| - 72x + (1.37)(7/2)ln|secx+tanx| + 46.8] from -π/4 to π/4
V = (2π)(7/2)(ln|11+6√3| + ln|11-6√3| + 1.37ln|11+6√3| + 1.37ln|11-6√3| - 144)
V ≈ 305.64 cubic units.
Therefore, the volume of the solid generated by revolving the region bounded by the curve y=7secx and the line y=72 over the interval − π/4≤x≤ π/4 about the x-axis is approximately 305.64 cubic units.
To find the volume of the solid generated by revolving the region bounded by the curve y=7sec(x) and the line y=72 over the interval -π/4≤x≤π/4 about the x-axis, you can use the disk method. The formula for the disk method is:
Volume = π * ∫[R(x)² - r(x)²] dx from a to b
In this case, R(x) represents the outer radius, which is given by y=72, and r(x) represents the inner radius, which is given by y=7sec(x). The limits of integration are a=-π/4 and b=π/4. Therefore, the volume can be calculated as:
Volume = π * ∫[72² - (7sec(x))²] dx from -π/4 to π/4
Now, evaluate the integral and multiply by π to find the volume of the solid.
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Matthew is saving money for a pet turtle. The data in the table represent the total amount of money in dollars that he saved by the end of each week.
A graph of the points that represent this data are shown on the coordinate plane attached below.
How to construct and plot the data in a scatter plot?In this scenario, the week number would be plotted on the x-axis (x-coordinate) of the scatter plot while the amount of money (in dollars) would be plotted on the y-axis (y-coordinate) of the scatter plot through the use of Microsoft Excel.
On the Excel worksheet, you should right click on any data point on the scatter plot, select format trend line, and then tick the box to display an equation for the line of best fit (trend line) on the scatter plot.
From the scatter plot (see attachment) which models the relationship between the week number and the amount of money (in dollars), a linear equation for the line of best fit is as follows:
y = 1.19x + 1.05
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Kyra has 2 plates, 2 cups, and 2 bowls. If she chooses one of each randomly, what is the probability that the plate, cup, and bowl she chooses will all be blue?
0.167
0.333
0.125
0.083
The probability is 0.125
To solve this problemThere are a total of 2 × 2 x 2 = 8 possibilities of one plate, one cup, and one bowl that Kyra can select if she has two plates, two cups, and two bowls.
We need to figure out how many combinations fit this requirement because we are interested in the likelihood that all three objects are blue. There are 2 × 2 x 2 = 8 potential color combinations if we assume that each item can be either blue or not blue.
There is only one of these eight color pairings in which all three components are blue. P(all three are blue) = 1/8 = 0.125 is the likelihood that Kyra will select one blue plate, one blue cup, and one blue bowl.
So, the probability is 0.125.
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without a calculator find out
√28 ÷ √7
Step-by-step explanation:
= sqrt ( 28 ÷7) = sqrt (4) = 2
Answer:
2
Step-by-step explanation:
First we put the two equations together so it would be like this
[tex]\sqrt \frac{28}{7}[/tex]
the square root of that is 4 because 7 goes into 28 four times
so now we have this [tex]\sqrt{4}[/tex]
and the square root of 4 is 2
Walter is planning a trip to morocco. he is trying to decide which cities he would like to visit while he is there. the table below shows some possible cities walter could visit, along with the amount of money he expects to spend on food, lodging, travel, and similar expenses for each city. all prices are given in moroccan dirham (mad). city cost (mad) tangier 610 casablanca 466 agadir 950 rabat 927 oujda 683 fes 478 marrakech 965 kenitra 778 walter’s original itinerary included trips to marrakech, fes, kenitra, and oujda, but because he only has a budget of mad 2,500, he must alter his plans to be more affordable. which of the following itinerary changes will allow walter to stay within his budget? (consider each option individually, rather than as a group.) i. replace kenitra with tangier and oujda with casablanca. ii. drop fes. iii. replace marrakech with casablanca. a. i and ii b. ii and iii c. iii only d. none of these will put walter under budget.
Walter can stay within his budget by dropping Fes (option ii).
Walter's original itinerary includes trips to Marrakech, Fes, Kenitra, and Oujda, which will cost him a total of 478 + 478 + 778 + 683 = MAD 2,417. This exceeds his budget of MAD 2,500.
Option i suggests replacing Kenitra with Tangier and Oujda with Casablanca, which will cost a total of 610 + 466 + 610 + 466 = MAD 2,152. However, this still exceeds Walter's budget.
Option iii suggests replacing Marrakech with Casablanca, which will cost a total of 965 + 466 + 778 + 683 = MAD 2,892, which is over Walter's budget.
Therefore, the only option that allows Walter to stay within his budget is to drop Fes from his itinerary, which will cost a total of 478 + 778 + 683 = MAD 1,939. This is well within his budget of MAD 2,500. So optio 2 is correct.
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WILL MARK BRAINLIEST QUESTION IN PHOTO
Step-by-step explanation:
See image....check my math ! ( I didn't)
A circle of radius 6 is centred at the origin, as shown.
The tangent to the circle at point P crosses the y-axis at (0, -14).
Work out the coordinates of point P.
Give any decimals in your answer to 1 d.p.
Answer:
P = (5.4, -2.6)
Step-by-step explanation:
[tex]\boxed{\begin{minipage}{5 cm}\underline{Equation of a circle}\\\\$(x-h)^2+(y-k)^2=r^2$\\\\where:\\ \phantom{ww}$\bullet$ $(h,k)$ is the center. \\ \phantom{ww}$\bullet$ $r$ is the radius.\\\end{minipage}}[/tex]
As the given circle has a radius of 6 units and is centred at the origin, the equation of the circle is:
[tex]x^2+y^2=36[/tex]
The formula for the equation of the tangent line to a circle with the equation x² + y² = a² is:
[tex]\boxed{y = mx \pm a \sqrt{1+ m^2}}[/tex]
where:
m is the slope.a is the radius of the circle.To find the slope of the equation of the tangent line to the circle that passes through the point (0, -14), substitute a = 6, x = 0 and y = -14 into the formula and solve for m:
[tex]\implies -14 = m(0) \pm 6 \sqrt{1+ m^2}[/tex]
[tex]\implies -14 = \pm 6 \sqrt{1+ m^2}[/tex]
[tex]\implies \pm\dfrac{14}{6} =\sqrt{1+ m^2}[/tex]
[tex]\implies \left(\pm\dfrac{14}{6}\right)^2 =1+m^2[/tex]
[tex]\implies m^2= \left(\pm\dfrac{14}{6}\right)^2-1[/tex]
[tex]\implies m^2=\dfrac{40}{9}[/tex]
[tex]\implies \sqrt{m^2}= \sqrt{\dfrac{40}{9}}[/tex]
[tex]\implies m=\pm\sqrt{\dfrac{40}{9}}[/tex]
[tex]\implies m=\pm\dfrac{2\sqrt{10}}{3}[/tex]
The slope-intercept form of a straight line is y = mx + b, where m is the slope and b is the y-intercept.
As the slope of the given tangent line is positive, and the y-intercept is (0, -14), the equation of the tangent line is:
[tex]\boxed{y=\dfrac{2\sqrt{10}}{3}x-14}[/tex]
As point P is the point of intersection of the circle and the tangent line, substitute the tangent line into the equation of the circle and solve for x:
[tex]x^2+\left(\dfrac{2\sqrt{10}}{3}x-14\right)^2=36[/tex]
Expand the brackets:
[tex]x^2 +\dfrac{40}{9}x^2-\dfrac{56\sqrt{10}}{3}x+196=36[/tex]
Subtract 36 from both sides of the equation:
[tex]\dfrac{49}{9}x^2-\dfrac{56\sqrt{10}}{3}x+160=0[/tex]
Multiply both sides of the equation by 9:
[tex]49x^2-168\sqrt{10}x+1440=0[/tex]
Rewrite the equation in the form a² - 2ab + b²:
[tex](7x)^2-2 \cdot 7 \cdot 12\sqrt{10}x+(12\sqrt{10})^2=0[/tex]
Apply the Perfect Square formula: a² - 2ab + b² = (a - b)²
[tex](7x-12\sqrt{10})^2=0[/tex]
Solve for x:
[tex]7x-12\sqrt{10}=0[/tex]
[tex]7x=12\sqrt{10}[/tex]
[tex]x=\dfrac{12\sqrt{10}}{7}[/tex]
To find the y-coordinate of point P, substitute the found value of x into the equation of the tangent line:
[tex]y=\dfrac{2\sqrt{10}}{3}\left(\dfrac{12\sqrt{10}}{7}\right)-14[/tex]
[tex]y=\dfrac{2\sqrt{10}\cdot 12\sqrt{10}}{3\cdot 7}\right)-14[/tex]
[tex]y=\dfrac{240}{21}-14[/tex]
[tex]y=\dfrac{80}{7}-\dfrac{98}{7}[/tex]
[tex]y=-\dfrac{18}{7}[/tex]
Therefore, the exact coordinates of point P are:
[tex]\left(\dfrac{12\sqrt{10}}{7}, -\dfrac{18}{7}\right)[/tex]
The coordinates of point P to 1 decimal place are:
[tex](5.4, -2.6)[/tex]
An aquarium manager drena
blueprint for a cylindrical fish tanka
the tank has a vertical tube in the
middle in which visitors can stand
and view the fish
the best average density for the species of fish that will go in the
tankis 16 fish per 100 gallons of water. this provides enough
room for the fish to swim while making sure that there are
plenty of fish for people to see
the aquarium has 275 fish available to put in the tank, s bis he
right number of fish for the tank. if not, how many fich should
be added or removed? explain your reasoning
To determine if the 275 fish are the right number for the cylindrical fish tank, we need to calculate the tank's capacity and compare it to the recommended average density of 16 fish per 100 gallons of water.
The volume of a cylinder is given by the formula V = πr^2h, where V is the volume, r is the radius, and h is the height of the cylinder.
Assuming the tank has a height of h and a radius of r, we can calculate its volume as follows:
[tex]V = πr^2h[/tex]
Since the tank has a vertical tube in the middle, we need to subtract the volume of the tube from the total volume of the tank. Let's assume the tube has a radius of 2 feet and a height of 8 feet. Then the volume of the tube is:
Vtube = π(2)^2(8) = 100.53 cubic feet
Thus, the volume of the tank without the tube is:
Vtank = πr^2h - Vtube
To find the value of r, we need to know the diameter of the tank. Let's assume the tank has a diameter of 10 feet, which means the radius is 5 feet.
Then the volume of the tank without the tube is:
Vtank = π(5)^2h - 100.53
We need to convert the volume of the tank from cubic feet to gallons, so we multiply by 7.48 (1 cubic foot = 7.48 gallons):
Vtank(gallons) = 7.48[π(5)^2h - 100.53]
Now we can calculate the recommended number of fish for the tank:
Recommended number of fish = 16 fish/100 gallons x Vtank(gallons)
Recommended number of fish = 16 fish/100 gallons x 7.48[π(5)^2h - 100.53]
Recommended number of fish = 1.175[π(5)^2h - 100.53]
So, if the number of fish available is 275, we can set up the following equation:
275 = 1.175[π(5)^2h - 100.53]
Solving for h, we get:
h = (275/1.175π(5)^2) + (100.53/π(5)^2)
h ≈ 8.3 feet
Therefore, the cylindrical fish tank with a height of 8.3 feet and a radius of 5 feet can hold 275 fish with an average density of 16 fish per 100 gallons of water. If the aquarium manager wants to add more fish, they should recalculate the volume of the tank and adjust the height accordingly to maintain the recommended density of 16 fish per 100 gallons of water. Conversely, if they want to remove fish, they can do so without changing the height of the tank.
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there are at present 40 solar energy construction firms in the state of indiana. an average of 20 solar energy construction firms open each year in the state. the average firm stays in business for 10 years. if present trends continue, what is the expected number of solar energy construction firms that will be found in indiana? if the time between the entries of firms into the industry is exponentially distributed, what is the probability that (in the steady state) there will be more than 300 solar energy firms in business? (hint: for large l, the poisson distribution can be approximated by a normal distribution.)
a) The expected number of solar energy construction firms that will be in indiana
is equal to 200 firms.
b) In case of exponential Probability distribution that there will be more than 300 solar energy firms in business is equals to the 0.305 × 10⁻⁵ .
The Poisson process is used when events are independent of each other and the average rate is constant. Two events cannot occur simultaneously. We have a data of about the number of solar energy construction firms in the state of indiana. Number of solar energy construction firms in the state at present
= 40
Average of solar energy construction firms open each year in the state = 20
For number of year average firm stays in business = 10 years.
We have to determine the expected number of solar energy construction firms that will be found in indiana. Let X be excepted value,then (X∼Poi(λt)X∼ Poi(200),
a) If the present trends continue, then the expected number of energy construction firms that will be found in Indiana will be
Expected Number of firms = 20× 10
= 200 firms
(b) If the time between the entries of firms into the industry is exponentially distributed. Then the probability that there will be more than 300 solar energy firms in business, P ( x> 300) = e⁻ᵐˣ , where m = 1/20 and x
= 300
=> P( x> 300) = 1/exp.( 300/20)
= e⁻¹⁵
= 0.0000003059 = 0.305 × 10⁻⁵
Hence, required probability value is 0.305 × 10⁻⁵.
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in each hand of a card game, there is a 54% chance of winning 3 points and a 46% chance of losing 4 points. is the game a fair game? explain
Answer: yes, the game is fair.
Step-by-step explanation:
The game is fair because:
a. you are playing with multiple players, and they have equal odds
b. the odds of winning are higher, so there is balance since you earn less points.
Give brainliest please!
1) What do you think this graph is suggesting regarding skill levels for future employment, give two suggestions..
2) What occupational group will people with a skill level 5 be able to join?
Answer:
1) I think the graph is suggesting that a higher level of skill, or degree, will ultimately help you get a better job easier and faster.
2) With a skill level of five, you can become a sales worker or labourer. It is a low percentage of people with a skill level five to become community and personal service workers.
Thanks for reading! Always work toward your dreams! :)
A rectangular portrait is 4 feet wide and 6 feet high. It costs $1. 64 per foot to put a gold frame around the portrait. How much will the frame cost?
The cost of the Portrait frame cost is: $32.8
What is the total cost per length?The formula for the perimeter of a rectangle is given by the expression:
A = 2(L + W)
Where:
L is Length
W is Width
We are given that:
Width: W = 4 ft
Height: H = 6 ft
Thus:
Perimeter = 2(6 + 4)
= 20 ft
Cost of the rectangular portrait per foot is $1.64
Thus:
Total cost = 20 * 1.64
= $32.8
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A car can be rented for $75 per week plus $0. 15 per mile. How many miles can be driven if you have at most $180 to spend for weekly transportation
You can drive at most 700 miles within the $180 budget for weekly transportation.
To determine how many miles can be driven with a budget of $180 for weekly transportation, we'll use the given information: $75 per week for car rental and $0.15 per mile driven. First, subtract the weekly rental cost from the total budget:
$180 - $75 = $105
Now, divide the remaining budget by the cost per mile to find the maximum number of miles that can be driven:
$105 ÷ $0.15 ≈ 700 miles
So, you can drive at most 700 miles within the $180 budget for weekly transportation.
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What does the mapping found in part b tell you about the relationship between the two circles? explain your reasoning.
The term "mapping" refers to the process of creating a mathematical correspondence between points or objects in two different sets. In this case, the mapping found in part b tells us that there exists a one-to-one correspondence between the points in Circle A and the points in Circle B.
There is a one-to-one correspondence between the points in Circle A and the points in Circle B, and that this correspondence preserves distance.
This means that for every point in Circle A, there is exactly one corresponding point in Circle B that is the same distance away from the center of the circle as the original point.
Since the correspondence is one-to-one, it follows that the two circles have the same number of points. That is, if Circle A has n points, then Circle B also has n points.
Therefore, we can conclude that the two circles have the same size.
Furthermore, because the correspondence preserves distance, any transformation that maps one circle onto the other must be a rigid motion, meaning it preserves angles and distances.
In particular, the transformation must be an isometry.
Therefore, we have shown that the two circles are congruent. That is, they have the same size and shape, and can be transformed onto one another by a combination of translations, rotations, and reflections.
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Alexandra and her mother are planting a rectangular garden. In the middle of the garden they will plant the vegetables and they will plant flowers around vegetable garden, as shown below.
If the area around the vegetable garden is of uniform width (labeled with x) and the dimensions of the vegetable garden is 45 feet by 20 feet, what expression represents the area of the flower garden?
Make sure to show all of your steps in your answer, including the area of the vegetable garden and the area of the entire garden.
The expression for the area of the flower garden is (45+2x)(20+2x) - 900.
How to solveArea of vegetable garden:
[tex]A_v = 45 ft * 20 ft[/tex] = 900 sq ft
Dimensions of entire garden:
Length = 45 ft + 2x
Width = 20 ft + 2x
Area of entire garden:
[tex]A_e = (45+2x)(20+2x)[/tex]
Area of flower garden:
[tex]A_f = A_e - A_v = (45+2x)(20+2x) - 900 sq ft[/tex]
So, the expression for the area of the flower garden is (45+2x)(20+2x) - 900.
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An art teacher times his students, in minutes, to see how long it takes them to paint a 12-inch canvas. He makes a box plot for the data. Paint Times
10 15 20 25 30 35 40 45 50 55
How long could a student take to paint their canvas if they are slower than 75% of the other students? 15 minutes O 25 minutes O 40 minutes 0 46 minutes
To find the answer, we need to identify the quartiles of the data set and use them to construct the box plot.
First, we need to order the data set in increasing order:
10, 15, 20, 25, 30, 35, 40, 45, 50, 55
Next, we need to find the median (Q2) of the data set. Since we have an even number of data points, we take the average of the two middle values:
Q2 = (25 + 30) / 2 = 27.5
This value represents the median of the data set.
To find Q1 and Q3, we divide the data set into two halves:
10, 15, 20, 25, 30 | 35, 40, 45, 50, 55
Q1 is the median of the lower half:
Q1 = (15 + 20) / 2 = 17.5
Q3 is the median of the upper half:
Q3 = (45 + 50) / 2 = 47.5
We can now use this information to construct the box plot:
| -------
| /
| -------
| /
|-------
| 10 20 30 40 50
Q1 Q2 Q3
The box represents the middle 50% of the data (from Q1 to Q3), while the whiskers represent the minimum and maximum values that are not outliers.
Since we want to find the paint time for a student who is slower than 75% of the other students, we need to look at the upper quartile (Q3) of the data set. 75% of the data is contained between Q1 and Q3, so a student who is slower than 75% of the other students would have a paint time greater than Q3.
Therefore, the answer is 46 minutes, which is greater than Q3 (47.5 minutes).
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Identify the equation of the line that passes through the pair of points (−3, 6) and (−5, 9) in slope-intercept form.
Therefore, the equation of the line that passes through the points (-3, 6) and (-5, 9) in slope-intercept form is:
y = -3/2 x + 3/2
Step-by-step explanation:
To find the equation of the line that passes through the points (-3, 6) and (-5, 9) in slope-intercept form (y = mx + b), we need to first find the slope of the line using the formula:
m = (y2 - y1) / (x2 - x1)
where (x1, y1) = (-3, 6) and (x2, y2) = (-5, 9).
m = (9 - 6) / (-5 - (-3))
m = 3 / (-2)
m = -3/2
Now that we have the slope, we can use either of the two given points and the slope to find the y-intercept (b) of the line:
y = mx + b
6 = (-3/2)(-3) + b
6 = 9/2 + b
b = 6 - 9/2
b = 3/2
I NEED SERIUOS HELPPP
The regression line equation, can be found to be y = 0.90x - 3.79
How to find the regression equation ?Find the slope using the slope formula :
m = ( 5 x 1944 - 98 x 69 ) / ( 5 x 2580 - 98² )
m = ( 9720 - 6762 ) / ( 12900 - 9604 )
m = 2958 / 3296
= 0.8975
Then find the y - intercept :
b = ( 69 - 0. 8975 x 98) / 5
b = ( 69 - 87. 945) / 5
b = - 18. 945 / 5
= - 3.789
The regression equation is:
y = 0.90x - 3.79
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You are going to run at a constant speed of 7.5
miles per hour for 45
minutes. You calculate the distance you will run. What mistake did you make in your calculation? [Use the formula S=dt
.]
The value of the distance you will run is 5.62500 miles
Calculating the value of the distance you will runFrom the question, we have the following parameters that can be used in our computation:
You are going to run at a constant speed of 7.5 miles per hour For 45 minutesThis means that
Speed = 7.5 miles per hour
Time = 45 minutes
The distance you will run is calculated as
Distance = Speed * Time
Substitute the known values in the above equation, so, we have the following representation
Distance = 7.5 miles per hour * 45 minutes
Evaluate the product
Distance = 5.62500 miles
Hence, the distance is 5.62500 miles
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please help.
1. Complete the Pythagorean triple. (24,143, ___)
2. Given the Pythagorean triple (5,12,13) find x and y
3. Given x=10 and y=6 find associated Pythagorean triple
4. Is the following a possible Pythagorean triple? (17,23,35)
The value that will complete Pythagorean triple would be = 24,143, 145 )
How to calculate the missing value of a triangle using the Pythagorean formula?To calculate the missing value of a triangle that completes a Pythagorean triple that formula that should be used is given as follows.
That is;
C ² = a² + b²
C = Missing value of the Pythagorean triple
a = 24
b.= 143
C² = 24²+143²
= 576+20,449
C =√21,025
= 125
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