The size of the population of 100 individuals which are undergoing exponential growth is equal to 400.
Population is undergoing exponential growth,
Use the formula of exponential ,
Nt = N0 × e^(rt)
Where,
Nt is the population size at time t
N0 is the initial population size
e is the mathematical constant, approximately 2.71828
r is the growth rate
If the population doubling time is 1 year,
Use the following formula to calculate the growth rate,
r = log(2) / t
Where t is the doubling time,
log(2) is the natural logarithm of 2 = approximately 0.693.
⇒ r = log(2) / 1 year
= 0.693 / year
Plug in the values,
Nt = N0 × e^(rt)
⇒Nt = 100 × e^(0.693 × 2)
Population size in 't' = 2 years.
Nt = 100 × e^1.386
⇒Nt = 100 × 3.998
⇒Nt = 100 ×4.000
⇒ Nt = 400
Therefore, the population will be 400 individuals in 2 years if it continues to undergo exponential growth with a population doubling time of 1 year.
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Area of parallelograms, quadrilaterals and polygons - tutorial - part 2. level f
ft
what is the area of the first triangle?
1 ft
1ft
1ft
3ft
4ft
The area of the first triangle is 0 square feet.
To find the area of the first triangle with the given side lengths of 1 ft, 3 ft, and 4 ft, you can use Heron's formula.
Calculate the semi-perimeter (s) of the triangle:
s = (a + b + c) / 2
where a, b, and c are the side lengths of the triangle.
s = (1 + 3 + 4) / 2 = 8 / 2 = 4 ft
Apply Heron's formula to find the area (A) of the triangle:
A = √(s * (s - a) * (s - b) * (s - c))
A = √(4 * (4 - 1) * (4 - 3) * (4 - 4))
A = √(4 * 3 * 1 * 0)
A = √0 = 0
The area of the first triangle is 0 square feet. This means that the given side lengths do not form a valid triangle, as two sides' lengths (1 ft and 3 ft) do not add up to be greater than the length of the third side (4 ft).
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Find the length of the entire perimeter of the region inside r = 7 sin Ф but outside r = 2.
To find the length of the entire perimeter of the region inside r = 7 sin Ф but outside r = 2, we first need to determine the boundaries of the region.
The equation r = 7 sin Ф represents a curve that forms a flower-like shape, while the equation r = 2 represents a circle with radius 2.
To find the region inside r = 7 sin Ф but outside r = 2, we need to find the points where these two curves intersect.
Setting the two equations equal to each other, we get:
7 sin Ф = 2
Solving for sin Ф, we get:
sin Ф = 2/7
Using a calculator, we can find the two values of Ф that satisfy this equation to be approximately 0.304 and 2.837 radians.
Thus, the region inside r = 7 sin Ф but outside r = 2 is bounded by the angles 0.304 and 2.837 radians.
To find the length of the entire perimeter of this region, we need to integrate the length element around this curve:
L = ∫(from 0.304 to 2.837) √[r² + (dr/dФ)²] dФ
Using the equation r = 7 sin Ф, we can substitute and simplify the expression under the square root:
L = ∫(from 0.304 to 2.837) √[49sin²(Ф) + 49cos²(Ф)] dФ
L = ∫(from 0.304 to 2.837) 7 dФ
L = 7(2.837 - 0.304)
L = 16.1
Therefore, the length of the entire perimeter of the region inside r = 7 sin Ф but outside r = 2 is approximately 16.1 units.
To find the length of the entire perimeter of the region inside r = 7 sin Ф but outside r = 2, we must first identify the points of intersection between the two curves.
1. Set the equations equal to each other:
7 sin Ф = 2
2. Solve for Ф:
sin Ф = 2/7
Ф = arcsin(2/7)
Now, we must determine the length of the perimeter of each curve in the region of interest:
3. Length of the perimeter of r = 7 sin Ф (half of the curve, since it's within the specified region):
For a polar curve r = f(Ф), the arc length L is calculated using the formula L = ∫√(r² + (dr/dФ)²) dФ.
In this case, f(Ф) = 7 sin Ф, so dr/dФ = 7 cos Ф. Integrating over the range [0, arcsin(2/7)], we can find the half-length of this curve.
4. Length of the perimeter of r = 2 (portion of the circle outside the region):
Since we know the points of intersection from step 2, we can find the central angle of the circular segment using Ф. The central angle is 2 * arcsin(2/7), and the circumference of the circle is 2π * 2. The portion of the perimeter is given by the ratio of the central angle to 2π, multiplied by the circumference.
Finally, add the lengths obtained in steps 3 and 4 to get the total length of the entire perimeter of the region.
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Jason wants to earn at least $250 each week working during the
summer.
Jason earns $6. 00 an hour babysitting.
Jason earns $7. 75 an hour working at a store.
He can work no more than 40 hours each week.
Let b equal hours of babysitting, and s equal hours working at the
store.
Which system of inequalities models the constraints?
O 6. 00b + 7. 755 2 250
b +5 s 40
O 6. 00b + 7. 75s 250
b +5 s 40
O 6. 000 + 7. 75s 40
b + s 250
O 6. 00b + 7. 75s 2 40
b + s 250
Answer:
The correct system of inequalities that models the constraints is:
6.00b + 7.75s ≥ 250
b + s ≤ 40
Explanation:
The first inequality represents the requirement that Jason needs to earn at least $250 each week. The earnings from babysitting are $6.00 per hour, and the earnings from working at the store are $7.75 per hour.
Therefore, the total earnings from both jobs can be represented by the expression 6.00b + 7.75s. This expression must be greater than or equal to $250, hence the first inequality.
The second inequality represents the constraint that Jason can work no more than 40 hours each week. The variables b and s represent the number of hours worked babysitting and working at the store, respectively.
The sum of these hours must be less than or equal to 40, hence the second inequality.
Therefore, the correct system of inequalities is:
6.00b + 7.75s ≥ 250
b + s ≤ 40
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(PLEASE HELP + POINTS)
Select the correct graph.
Smith's Produce sells packages of pre-cut vegetables. The company has a tolerance level of less than or equal to y grams for a 250-gram
package. Which graph could be used to determine the variance levels that would result in a package of vegetables being rejected because of
its weight, X?
(Picture of graphs)
The answer of the given question based on the graph could be used to determine the variance levels that would result in a package of vegetables is histogram.
To determine the variance levels that would result in a package of vegetables being rejected because of its weight, X, consider the following:
1. The company has a tolerance level of less than or equal to y grams for a 250-gram package. This means that the graph must represent a relationship between the weight of the package (X) and the tolerance level (y).
2. Since the package is rejected if it weighs more than the allowed tolerance, the graph should show that as the weight (X) increases, the acceptance range decreases (y decreases).
3. The graph should ideally have a boundary line that represents the maximum tolerance level (y). Any points above this line would represent rejected packages.
Based on these criteria, you should select the graph that best represents this relationship between the weight of the package (X) and the tolerance level (y), where packages with a weight exceeding the tolerance level are rejected.
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find the exact area of a square with a diagonal of 8 inches
Answer:
(8/√2)^2 = 64/2 = 32 square inches
PLS HELP! and actually answer the question please
Step-by-step explanation:
First start with the graph of y = | x|
then shift it RIGHT one unit
| x -1 |
then shift it DOWN one unit
y= |x-1| -1
The function f(t)=350(1. 2)^{365t}f(t)=350(1. 2)
365t
represents the change in a quantity over t years. What does the constant 1. 2 reveal about the rate of change of the quantity?
The constant 1.2 in the function represents the rate of change of the quantity per year.
Specifically, it represents the factor by which the quantity grows or decays over a year.
Since 1.2 is greater than 1, the function describes an exponential growth, where the quantity is multiplied by 1.2 each year.
For example, after one year, the quantity is multiplied by 1.2, after two years it is multiplied by 1.2 squared, and so on.
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For Items 6-10, the height of an object, in centimeters, is modeled by the function y = 42sin (π/10 (x-h)+ 55. Determine whether each statement is always, sometimes, or never true.
6. The period of the function is 20.
7. The maximum height of the object is 55 centimeters
8. The minimum height of the object occurs when x=0
9. The graph of the function has the midline y= 55
10. The amplitude of the function is 84.
Answer:
It's fascinating to observe how the volume of different shapes can vary based on their measurements. For instance, a cylinder with a height of 6 centimeters and radius r1 has a volume of 302 cubic centimeters. Do you require further assistance?
As for the new set of instructions, please consider the following statements:
6. Sometimes true. The period of the function is determined by the formula T= 2π/b, where b is the coefficient of x in the argument of the sine function. In this case, b = π/5, so T= 10.
7. Always true. The maximum height of the object is equal to the amplitude of the function plus the vertical shift, which is 55 centimeters.
8. Sometimes true. The minimum height of the function occurs when the sine function has a value of -1, which happens at x= h-5. So, if h= 0, then x= -5, which means the statement is sometimes true depending on the value of h.
9. Always true. The midline of the function is determined by the vertical shift, which is 55 in this case.
10. Always true. The amplitude of the function is given by A= |b|, where b is the coefficient of x in the argument of the sine function. In this case, A= 42π/5, which simplifies to 84.
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What is the value of x log3 x=4
Answer:
x=81
Step-by-step explanation:
Rewrite log_3 (x)=4 in exponential form using the definition of a logarithm. If x and b are positive real numbers and b≠1, then log_b(x)=y is equivalent to b^y=x.
Rewrite the equation as x=3^4
Raise 3 to the power of 4
x=81
please help me answer this (can give brainliest)
a) The graph of the given lines is as attached
b) The area of the enclosed triangle is: 8 square units
How to graph linear equations?The general form of expression of linear equations in slope intercept form is expressed as:
y = mx + c
where:
m is slope
c is y-intercept
We are given the equations as:
y = x + 5
y = 5
x = 4
The graph of these three linear equations is as shown in the attached file
2) The area of the given triangle enclosed by the three lines is gotten from the formula:
A = ¹/₂ * b * h
where:
A is area
b is base
h is height
Thus:
A = ¹/₂ * 4 * 4
A = 8 square units
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What is the vertex of the graph of the equation Y=3x2( to the second power) +6x+1
A.(-1,-2)
B.(-1, 10)
C.(1, -2)
D.(1, 10)
Answer: To find the vertex of the graph of the equation Y=3x^2+6x+1, we can use the formula:
x = -b/2a
where a = 3 and b = 6, which are the coefficients of the x^2 and x terms, respectively.
x = -6/(2 x 3) = -1
Substituting x = -1 into the equation, we get:
Y = 3(-1)^2 + 6(-1) + 1 = -2
Therefore, the vertex of the graph is (-1, -2), so the answer is A. (-1,-2).
Step-by-step explanation:
Question 11 Σ Determine whether the integral is divergent or convergent. If it is convergent, evaluate it. If it diverges to infinity, state your answer as "oo" (without the quotation marks). If it diverges to negative infinity, state your answer as "-00". If it diverges without being infinity or negative infinity, state your answer as "DNE". 10 10 dc 2 6
The given integral is ∫₁₀ (10/(x-2)) dx.
The given integral is divergent and the answer is "oo".
To see why the integral is divergent, we can use the following limit comparison test:
∫₁₀ (10/(x-2)) dx ~ ∫₁₀ (1/x) dx, as x → 2.
The symbol "~" means "is asymptotic to". We can use this comparison because as x approaches 2 from the right, the function 10/(x-2) approaches positive infinity.
Now, we know that the integral ∫₁₀ (1/x) dx diverges because the improper integral of 1/x from 1 to infinity diverges. Therefore, by the limit comparison test, the original integral is also divergent.
Hence, the given integral ∫₁₀ (10/(x-2)) dx is divergent, and the answer is "oo".
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The ratio table shows the costs for different amounts of bird seed. find the unit rate in dollars per pound. the unit rate is $ per pound
The ratio table shows the costs for different amounts of birdseed. So, the unit rate is $2 per pound in this example.
To find the unit rate in dollars per pound, follow these steps:
1. Look at the given ratio table, which shows the costs for different amounts of bird seed.
2. Identify the cost and the corresponding amount (in pounds) of bird seed for any one row in the table.
3. Divide the cost (in dollars) by the amount (in pounds) to calculate the unit rate.
For example, if the table shows that the cost is $6 for 3 pounds of bird seed, the unit rate would be calculated as follows:
Unit rate = Cost / Amount
Unit rate = $6 / 3 pounds
Unit rate = $2 per pound
So, the unit rate is $2 per pound in this example
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Evaluate the line integral, where C is the given
curve.
C
y3ds,
C: x =
t3, y =
t, 0 ≤ t ≤ 5
Please provide the right answer.
Unfortunately, this integral doesn't have a simple closed-form solution. However, you can use numerical methods or software like Wolfram Alpha or a graphing calculator to approximate the value of the integral.
We have:
y = t and ds = sqrt(9t^4 + 1) dt
So, the line integral becomes:
∫C y^3 ds = ∫0^5 (t^3)(sqrt(9t^4 + 1)) dt
Using the substitution u = 9t^4 + 1, we get du/dt = 36t^3, which means dt = du/36t^3. Also, when t = 0, u = 1 and when t = 5, u = 1126.
Substituting these values and simplifying, we get:
∫C y^3 ds = (1/36) ∫1^1126 (u-1/4)(1/2) du
= (1/72) [(u-1)^2 u^(1/2)]_1^1126
= (1/72) [(1125)^2 (1126^(1/2)) - (1)^2 (1^(1/2))]
= 3555.89 (approx)
Therefore, the line integral is approximately equal to 3555.89.
To evaluate the line integral along the curve C with the given parameterization x = t^3 and y = t for 0 ≤ t ≤ 5, we need to find the integral of y^3ds. First, we need to find the derivative of the parameterization with respect to t:
dx/dt = 3t^2
dy/dt = 1
Now, we can find the differential arc length ds, which is given by the formula:
ds = √((dx/dt)^2 + (dy/dt)^2) dt
ds = √((3t^2)^2 + (1)^2) dt
ds = √(9t^4 + 1) dt
Next, substitute the parameterization of y in terms of t (y = t) into the integral:
∫(y^3 ds) = ∫(t^3 √(9t^4 + 1)) dt, with limits 0 to 5.
Now, evaluate the integral:
∫(t^3 √(9t^4 + 1)) dt from 0 to 5.
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How much will the monthly payment be for a new car priced at $24,530 if the current finance rate is 36 months at 3. 16%? You will finance the 8% TT&L and make a 20% down payment
The monthly payment for a new car priced at $24,530 with the given terms is $630.15.
Calculating the down payment:
20% of $24,530
= 0.20 × 24,530
= $4,906.
Subtracting the down payment from the car price:
= $24,530 - $4,906
= $19,624 (amount to finance).
Adding the 8% TT&L (tax, title, and license) to the amount to finance:
8% of $24,530
= 0.08 × 24,530
= $1,962.40.
So, the total amount to finance
= $19,624 + $1,962.40
= $21,586.40.
Converting the annual interest rate of 3.16% to a decimal:
3.16% / 100
= 0.0316.
Calculating the monthly interest rate:
0.0316 / 12
= 0.002633.
Calculating the total number of payments: 36 months.
Using the monthly payment formula:
P = (PV * r * (1 + r)^n) / ((1 + r)^n - 1),
where P is the monthly payment,
PV is the present value or amount to finance,
r is the monthly interest rate, and
n is the total number of payments.
Now, pluggin in the values:
P = ($21,586.40 × 0.002633 × (1 + 0.002633)³⁶) / ((1 + 0.002633)³⁶ - 1)
= $630.15.
The monthly payment for the new car will be approximately $630.15.
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The city is planning a concert that is expected to bring in a crowd of about
200,000 people. The concert will be held in a public park. The city planners are thinking
about the size and shape of the space that will be needed to accommodate this
number of people.
At a much smaller yet similar event, the crowd was estimated to be about
22,000 people. At this event, the crowd was confined to an area that was roughly the
shape of a right triangle with side lengths that were approximately 300 feet, 350 feet,
and 461 feet.
Determine the appropriate dimensions of a similar space with 200,000 people.
Show your work or explain your modeling.
hallar larger
The dimensions of the larger space would be roughly 300 x 350 x 461 feet multiplied by the scaling factor of 3.01. This gives dimensions of approximately 903 x 1053 x 1388 feet.
To determine the appropriate dimensions of a space that can accommodate 200,000 people, we can use the concept of similarity.
We know that the smaller event had a crowd of 22,000 people and the area was roughly a right triangle with side lengths of 300, 350, and 461 feet. We can use the ratio of the number of people to the area to find the scaling factor.
The area of the triangle is (1/2) x 300 x 350 = 52,500 square feet.
The ratio of people to area is 22,000/52,500 = 0.42 people per square foot.
To accommodate 200,000 people, we need an area of 200,000/0.42 = 476,190.5 square feet.
Assuming we maintain the same shape and proportions, we can use the area of the triangle as a guide to find the dimensions of the larger space. Let x be the scaling factor. Then:
(1/2) x (300x) x (350x) = 476,190.5
52,500x² = 476,190.5
x² = 9.05
x = 3.01
In summary, we can use the ratio of people to area to determine the appropriate dimensions of a space that can accommodate 200,000 people. By maintaining the same shape and proportions of a smaller event, we can find the scaling factor needed to determine the dimensions of the larger space.
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What is the volume, in cubic centimeters, of a cylinder with a height of 5 cm and a base radius of 10 cm, to the nearest tenths place?
The volume of the cylinder is approximately 1570.8 cubic centimeters, rounded to the nearest tenth.
A cylinder is a three-dimensional object with two congruent circular bases that are parallel to each other. The volume of a cylinder can be calculated using the formula V = πr²h, where V is the volume, r is the radius of the base, and h is the height of the cylinder.
In this problem, we are given that the height of the cylinder is 5 centimeters and the radius of the base is 10 centimeters. By substituting these values into the formula, we get:
V = π x 10² x 5
V = 500π
To calculate the volume of the cylinder, we can use an approximation for the value of pi. Taking pi to be approximately 3.14, we can calculate the volume as follows:
V ≈ 500 x 3.14
V ≈ 1570.8
Therefore, the volume of the cylinder to the nearest tenths place is approximately 1570.8 cubic centimeters.
It is important to note that the answer is an approximation since pi is an irrational number with an infinite number of decimal places. However, rounding to the nearest tenths place provides a reasonable level of precision for this calculation.
In summary, the volume of the cylinder is 1570.8 cubic centimeters, and the calculation is based on the given values and the formula for the volume of a cylinder.
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A candlemaker prices one set of scented candles at $10 and sells an average of 200 sets each week. He finds that when he reduces the price
by $1, he then sells 50 more candle sets each week. A function can be used to model the relationship between the candlemaker's weekly
revenue, R(x) after xone-dollar decreases in price.
R(x)
R(x)
6,000+
4,000+
6,000+
1,000+
2. 000
2,000+
2,000
2,000+
-4,000
4,000
6,000+
-6,000
Graph w
R(x)
Graph X
R(x)
6,000+
1,000+
6,000+
1,000+
2,000+
2,000
-2,000+
2,000
1,000+
4,000
-6,000
6,000
Graph Y
Graph Z
This situation can be modeled by the equation y =
x +
x +
and by graph
Next
The equation of demand of candle sticks can be modeled by
y = 14 - 0.02x while the revenue function will be xy = 14x - 0.02x².
Here we are given the information that
200 candles are sold for $10 and,
250 candles are sold for $9
Let the Price be y while the Quantity sold be x
Hence, by one unit decrease in price P, the quantity sold is increased by 50 units.
Here the slope of the function will be
(10 - 9)/(200 - 250)
= - 1/50
= - 0,02
Now we will use the formula of the equation of a straight line
(y - y₁) = m(x - x₁)
where, m is the slope and x₁ , y₁ are some point on line
Hence we get
(y - 10) = -0.02(x - 200)
or, y - 10 = -0.02x + 4
or, y = 14 - 0.02x
The revenue function will be xy = 14x - 0.02x²
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Correct Question
A candlemaker prices one set of scented candles at $10 and sells an average of 200 sets each week. he finds that when he reduces the price by $1, he then sells 50 more candle sets each week. a function can be used to model the relationship between the candlemaker's weekly revenue, r(x), after one-dollar decrease in price. this situation can be modeled by the equation y =
Evaluate the following limit. Use l'Hôpital's Rule when it is convenient and applicable. lim sin 3 X00 lim 3 Xod in ) - 0 () (Type an exact answer.) X
The overall limit is undefined as the the second limit is undefined
The given limit is of the indeterminate form 0/0 and hence we can apply l'Hôpital's Rule to evaluate it.
Applying l'Hôpital's Rule, we get:
lim sin(3x) / (3x) = lim [cos(3x) * 3] / 3 = cos(3x)
Now, we need to evaluate lim (3x)/(1 - cos(x)) as x approaches 0.
Again, this limit is of the indeterminate form 0/0, so we can apply l'Hôpital's Rule once again:
lim (3x)/(1 - cos(x)) = lim (3)/(sin(x)) = 3/0 (which is undefined)
Since the second limit is undefined, the overall limit is also undefined.
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Find the sum of the first 8 terms of the following sequence. Round to the nearest hundredth if necessary. 20,40,80,. Using the geometric series
The sum of the first 8 terms of the sequence is 5100. Rounded to the nearest hundredth, this is 5100.00
To find the sum of the first 8 terms of the sequence 20, 40, 80,..., we need to use the geometric series formula:
S = a(1 - r^{n}) / (1 - r)
where S is the sum of the first n terms, a is the first term, r is the common ratio, and n is the number of terms.
In this case, a = 20 (the first term), r = 2 (the common ratio, since each term is twice the previous one), and n = 8 (since we want to find the sum of the first 8 terms).
So plugging these values into the formula, we get:
S = 20(1 - 2^8) / (1 - 2)
S = 20(1 - 256) / (-1)
S = 20(255)
S = 5100
Therefore, the sum of the first 8 terms of the sequence is 5100. Rounded to the nearest hundredth, this is 5100.00.
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Find the probability that a randomly selected point within the circle falls in the white area. R=4 cm 2. 5 cm 3 cm 3 cm [?]% Round to the nearest tenth of a percent.
The probability is approximately 45.4% (rounded to the nearest tenth of a percent).
To find the probability that a randomly selected point within the circle falls in the white area, we need to find the area of the white region and divide it by the total area of the circle.
The total area of the circle is:
A = πr² = π(4 cm)² = 16π cm²
The area of the white region can be found by subtracting the area of the two semicircles from the area of the circle:
White area = A - 2(1/2π(2.5 cm)²) = 16π - 2(4.375π) = 7.25π cm²
So, the probability that a randomly selected point within the circle falls in the white area is:
P(white area) = (white area)/(total area) = (7.25π)/(16π) ≈ 45.4%
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What type of angles are 3 and 6
A. Alternate interior angles
B. Alternate exterior angles
C. Supplementary angles
D. Vertical angles
Find the missing side lengths. leave your answers as radicals in simplest form. show your work to support your answer.
The value of the missing side lengths a and b of the right angles triangle are 2 and √2 respectively.
A right-angled triangle's other angle must be 45 degrees because the base angle is that number. The third angle in a triangle must be 90 degrees since the sum of the triangle's three angles is 180 degrees.
Using trigonometric ratios, we know that,
sin(45) = 2√2/a and,
cos(45) = b/a.
Simplifying, we get,
a = 2√2/sin(45)
= 2√2/√2
= 2 and,
b = a cos(45)
= 2 cos(45)
= √2.
Therefore, the value of a is 2 and the value of b is √2.
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PLEASE HELP ASAP WILL GIVE BRAINLIEST
Lizzie came up with a divisibility test for a certain number m≠1: Break a positive integer n into two-digit chunks, starting from the ones place. (For example, the number 354764 would break into the two-digit chunks 35, 47, and 64) Find the alternating sum of these two-digit numbers, by adding the first number, subtracting the second, adding the third, and so on. (In our example, this alternating sum would be ) Find m and show that this is indeed a divisibility test for m (by showing that n is divisible by m if and only if the result of this process is divisible by m )
The value of m is 11, and the divisibility test states that n is divisible by 11 if and only if the alternating sum of its two-digit chunks is divisible by 11.
How to prove the divisibility test?Let's consider the given divisibility test proposed by Lizzie. The process involves breaking a positive integer, n, into two-digit chunks and finding the alternating sum of these chunks. The alternating sum is obtained by adding the first number, subtracting the second, adding the third, and so on.
To find the value of m that makes this a divisibility test, we need to analyze the properties of this test. Let's assume that n is divisible by m.
When n is divisible by m, each two-digit chunk in n will also be divisible by m. This means that the alternating sum of these chunks will also be by m since adding or subtracting multiples of m will not change its divisibility.
Conversely, if the alternating sum of the two-digit chunks is divisible by m, it implies that each chunk is divisible by m. Therefore, if the chunks are divisible by m, the original number n will also be divisible by m.
Hence, this process indeed serves as a divisibility test for m, where n is divisible by m if and only if the result of the alternating sum of the two-digit chunks is divisible by m.
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Leo’s family needs to cross a bridge. Because it is night, they must have a flashlight to cross. Dad takes one minute, mother three minutes, Leo six minutes, brother eight minutes, grandpa 12 minutes, and a maximum of two people can cross the bridge at a time, there is only one flashlight, and the power can only support 30 minutes. The bridge crossing time is calculated according to the slow person. How can Leo’s family cross the bridge before the flashlight runs out?
PLEASE FAST IM RUNNING OUT OF TIME ILL GIVE BRAINLIEST
We know that they cannot exceed 30 minutes, they should not waste any time and must move quickly during each crossing.
To ensure that Leo's family crosses the bridge before the flashlight runs out, they should follow these steps:
1. Dad and Mom should cross the bridge together, which will take 3 minutes (because the slowest person is Mom, who takes 3 minutes).
2. Dad should return to the starting point, which will take 1 minute.
3. Leo and Brother should then cross the bridge together, which will take 8 minutes (because the slowest person is Brother, who takes 8 minutes).
4. Mom should return to the starting point, which will take 3 minutes.
5. Dad and Grandpa should then cross the bridge together, which will take 12 minutes (because the slowest person is Grandpa, who takes 12 minutes).
6. Dad should return to the starting point, which will take 1 minute.
7. Finally, Dad and Mom should cross the bridge together, which will take 3 minutes (because the slowest person is Mom, who takes 3 minutes).
Adding up all the minutes taken, it will be: 3+1+8+3+12+1+3=31 minutes. However, since they cannot exceed 30 minutes, they should not waste any time and must move quickly during each crossing.
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What is the slope of the line?
The Environmental Protection Agency has determined that safe drinking water should have an average pH of 7. Water is unsafe if it deviates too far from 7 in either direction.You are testing water from a new source and randomly select 30 vials of water. The mean pH level in your sample is 6.4, which is slightly acidic.The Standard deviation of the sample is 0.5.(a) Does the data provide enough evidence at a = 0.05 level that the true mean pH of water from this source differs from 7?(b) A 95% confidence interval for the true mean pH level of the water is (6.21, 6.59). Interpret this interval.(c) Explain why the interval in part (b) is consistent with the result of the test in part (a).
a. The data provided enough evidence at a = 0.05 level that the true mean pH of water from this source differs from 7
b. A 95% confidence interval for the true mean pH level of the water is (6.21, 6.59) means about 95% of those intervals would contain the true mean pH level.
c. The estimated mean pH level of seven is not included in the interval in section (b). This is consistent with the result of the test in part (a), which also rejects the null hypothesis that the true mean pH level is 7.
(a) To test whether the true mean pH of water from this source differs from 7, we can perform a one-sample t-test. The null hypothesis is that the true mean pH is equal to 7, and the alternative hypothesis is that the true mean pH is not equal to 7.
The test statistic can be calculated as follows:
t = (sample mean - hypothesized mean) / (sample standard deviation / sqrt(sample size))
t = (6.4 - 7) / (0.5 / sqrt(30))
t = -3.07
Using a t-table with 29 degrees of freedom at a significance level of 0.05 (two-tailed test), the critical t-value is ±2.045. Since the calculated t-value (-3.07) is outside of the critical t-value range, we can reject the null hypothesis and conclude that there is enough evidence at a = 0.05 level to suggest that the true mean pH of water from this source differs from 7.
(b) A 95% confidence interval for the true mean pH level of the water is (6.21, 6.59). This means that if we were to take many random samples of size 30 from this water source, and construct a 95% confidence interval for each sample mean pH level, then about 95% of those intervals would contain the true mean pH level.
(c) The interval in part (b) does not include the hypothesized mean pH level of 7. This is consistent with the result of the test in part (a), which also rejects the null hypothesis that the true mean pH level is 7.
The confidence interval provides additional information by giving a range of plausible values for the true mean pH level, and we can see that all of the values in this range are below 7, indicating that the water is indeed slightly acidic.
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The radius of a circle is 7 centimeters. What is the circumference. Round the answer to the nearest hundredth
Answer:
43.96 cm
Step-by-step explanation:
Given
Radius ( r ) = 7 cm
To find : Circumference of Circle
Formula
Circumference of Circle = 2πr
Note
The Value of π = 3.14
Circumference of Circle
= 2πr
= 2 × 3.14 × 7
= 43.96 cm
Answer:
Not Rounded: 43.9822971503
Rounded: 44
Step-by-step explanation:
r= radius
2[tex]\pi[/tex]r
2[tex]\pi[/tex](7)
= 43.9822971503
Find the surface area of the triangular prism. The base of the prism is an isosceles triangle.
The surface area of the triangular prism is 3152 square cm if the base of the prism is an isosceles triangle.
What exactly is a triangular prism?
When a prism has three rectangular sides and two triangular bases, the prism is said to be triangular. It's a pentahedron. A right triangular prism has two faces and three rectangular sides. Bases refers to the triangle faces, whereas laterals refers to the rectangular sides.
We have a triangular prism, is showing in the picture:
Here a = 25
b = 25
c = 14
h = 44
The surface area of the triangular prism is given by
A = ah + bh + ch + 1/2√-a⁴ + 2(ab)² + 2(ac)² + -b⁴ + 2(bc)² - c⁴
Plug all the values in the formula we get:
A = 3152 square cm
Thus, the surface area of the triangular prism is 3152 square cm if the base of the prism is an isosceles triangle.
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One tire manufacturer claims that his tires last an average of 44000 miles with a standard deviation of 7650 miles. A random sample of 120 of his tires is taken. What is the probability that the average of this sample of tires will last longer than 45000 miles
The probability of a randomly selected tire from this sample having a lifespan greater than 45,000 miles is approximately 0.0639 or 6.39%.
We can use the central limit theorem to approximate the distribution of the sample mean.
In this case, the population mean is 44,000 miles and the population standard deviation is 7,650 miles. We are taking a sample of 120 tires, so the standard deviation of the sample mean is:
σ/√n = 7,650/√120 = 698.68
To find the probability that the sample mean will be longer than 45,000 miles, we need to standardize the sample mean using the formula:
z = (x - μ) / (σ / √n)
where x is the sample mean, μ is the population mean, σ is the population standard deviation, and n is the sample size.
Plugging in the values, we get:
z = (45,000 - 44,000) / (7,650 / √120) = 1.527
We can then look up the probability corresponding to a z-score of 1.527 in a standard normal distribution table or using a calculator. The probability of a randomly selected tire from this sample having a lifespan greater than 45,000 miles is approximately 0.0639 or 6.39%.
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