Answer:
Pens=13
Pencils=27
Step-by-step explanation:
1. Pens = x, Pencils = y
x+y=40
2. y+5 & x-5 --> y=4x
3. Rearrange the x+y=40 to y=40-x. Then substitute y=4x and y=40-x to 4x=40-x.
4. Solve. 4x=40-x, 5x=40, x=8
5. Plug in x=8 to y=4x -> y=32.
6. Reverse the y+5 & x-5. y=27, x=13.
7x-1 is less than or equal to 62 answer
The value of the variable is 9
How to determine the valueIt is important to note that inequalities are described as non- equal comparison of numbers or expressions.
The signs of inequalities represents;
< represents less than> represents greater thanFrom the information given, we have that;
7x - 1 is less than or equal to 62
This is represented as;
7x - 1≤ 62
collect the like terms, we have;
7x ≤ 62 + 1
Add the values
7x ≤ 63
Divide both sides by the coefficient, we get;
x ≤ 63/7
x ≤ 9
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3. Given f(x) = x² - 7x +13 and g(x) = x-2, solve f(x) = g(x) using the substitution method. Show your
work.
Answer:
The solutions for f(x) = g(x) are x = 5 and x = 3.
To solve f(x) = g(x) using substitution method, we need to substitute g(x) in place of x in the equation f(x) = x² - 7x + 13.
So, we have:
f(x) = g(x)
x² - 7x + 13 = x - 2 (Substituting g(x) = x - 2)
Now, we can solve for x by simplifying and solving the resulting quadratic equation:
x² - 8x + 15 = 0
Factoring the quadratic equation, we get:
(x - 5)(x - 3) = 0
So, x = 5 or x = 3.
Therefore, the solutions for f(x) = g(x) are x = 5 and x = 3.
To check, we can substitute each value back into the equations:
f(5) = 5² - 7(5) + 13 = 25 - 35 + 13 = 3
g(5) = 5 - 2 = 3
f(3) = 3² - 7(3) + 13 = 9 - 21 + 13 = 1
g(3) = 3 - 2 = 1
So, both solutions satisfy the original equation f(x) = g(x).
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According to the problem-solving strategies you learned in this lesson, what
should you do after you've gathered your resources on a problem?
A. Check your answers and present the solution.
B. Come to an answer.
C. Gather your resources again.
OD. Understand the problem.
Answer:
B.
Resources, as in details of the problem and then you do check the answers and present the solution.
Jack claims that QRST is a parallelogram. If m∠R = 72, m∠T = 108, and m∠S = 72, is he correct? Explain
We can conclude that Jack's claim is correct. QRST is indeed a parallelogram, since opposite angles in QRST are congruent, and opposite sides in a parallelogram are also congruent
To determine whether Jack's claim that QRST is a parallelogram is correct, we need to use the properties of parallelograms. One of the properties of a parallelogram is that opposite angles are congruent. Therefore, we need to check if the opposite angles in QRST are congruent.
If m∠R = 72 and m∠T = 108, then the sum of these angles is 180 degrees (72 + 108 = 180). This indicates that angles R and T are supplementary.
If m∠S = 72, then we need to find the measure of angle Q. Since QRST is a quadrilateral, the sum of its interior angles is 360 degrees.
m∠Q + m∠R + m∠S + m∠T = 360
Substituting the given values, we get:
m∠Q + 72 + 72 + 108 = 360
Simplifying the equation, we get:
m∠Q = 108
Therefore, angles Q and S are congruent (both measuring 72 degrees) and angles R and T are supplementary (measuring 72 and 108 degrees, respectively). Since opposite angles in QRST are congruent, and opposite sides in a parallelogram are also congruent, we can conclude that Jack's claim is correct. QRST is indeed a parallelogram.
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A statistics class weighed 20 bags of grapes purchased from the store. The bags are advertised to contain 16 ounces, on average. The class calculated the 90% confidence interval for the true mean weight of bags of grapes from this store to be (15. 875, 16. 595) ounces. What is the sample mean weight of grapes, and what is the margin of error?
The sample mean weight is 15. 875 ounces, and the margin of error is 16. 595 ounces.
The sample mean weight is 16. 235 ounces, and the margin of error is 0. 360 ounces.
The sample mean weight is 16. 235 ounces, and the margin of error is 0. 720 ounces.
The sample mean weight is 16 ounces, and the margin of error is 0. 720 ounces
The sample mean weight is 16.235 ounces, and the margin of error is 0.360 ounces.
How to find the sample mean?The sample mean weight of grapes is the midpoint of the confidence interval, which is given by:
sample mean = (lower bound + upper bound) / 2
sample mean = (15.875 + 16.595) / 2
sample mean = 16.235
Therefore, the sample mean weight of grapes is 16.235 ounces.
How ro find the margin of error?The margin of error is half the width of the confidence interval, which is given by:
margin of error = (upper bound - lower bound) / 2
margin of error = (16.595 - 15.875) / 2
margin of error = 0.360
Therefore, the margin of error is 0.360 ounces.
The correct answer is: The sample mean weight is 16.235 ounces, and the margin of error is 0.360 ounces.
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What is the domain and range of g(x)=-|x|
Answer:
Step-by-step explanation
Domain :
x
>
4
, in interval notation :
(
4
,
∞
)
Range:
g
(
x
)
∈
R
, in interval notation :
(
−
∞
,
∞
)
Explanation:
g
(
x
)
=
ln
(
x
−
4
)
;
(
x
−
4
)
>
0
or
x
>
4
Domain :
x
>
4
, in interval notation :
(
4
,
∞
)
Range: Output may be any real number.
Range:
g
(
x
)
∈
R
, in interval notation :
(
−
∞
,
∞
)
graph{ln(x-4) [-20, 20, -10, 10]} [Ans] x>4
Answer:
Step-by-step explanation:
The Domain of g(x) = -|x| is all real numbers (no restrictions on what values x can take).
The Range of g(x) = -|x| is all real numbers less than or equal to zero. Absolute value of any real number is always greater than or equal to zero, and multiplying by a negative sign, that flips the sign of the result. So, g(x) will always be less than or equal to zero.
Domain: (-∞, ∞), {x|x ∈ R}
Range: (-∞, 0), {y ≤ 0}
Two similar cylinders have heights 6cm and 30cm. The volume of the smaller cylinder is 90cm3. What is the volume of the larger cylinder?
Answer:
Step-by-step explanation:
Since the two cylinders are similar, their corresponding dimensions (radius and height) are proportional. Let the radius of the smaller cylinder be r.
Then, we can write:
r / 6 = R / 30
where R is the radius of the larger cylinder.
Simplifying this equation, we get:
R = 5r
Now, we can use the formula for the volume of a cylinder to find the volume of the larger cylinder:
Volume of smaller cylinder = πr^2h = 90 cm^3
Volume of larger cylinder = πR^2H = π(5r)^2(30) = 750πr^2 cm^3
Substituting R = 5r, we get:
Volume of larger cylinder = 750πr^2 cm^3
Therefore, the volume of the larger cylinder is 750π times the volume of the smaller cylinder:
Volume of larger cylinder = 750π(90 cm^3) = 67,500π/ cm^3 (approx. 211,239.74 cm^3 rounded to five decimal places).
A shipping company must design a closed rectangular shipping crate with a square base. The volume is 12288ft3. The material for the top and sides costs $2 per square foot and the material for the bottom costs $10 per square foot. Find the dimensions of the crate that will minimize the total cost of material.
Optimize crate cost by expressing material cost in terms of x and y, calculating cost of all four sides, and finding minimum cost. Optimal dimensions: x = 16 ft, y = 48 ft. Minimum cost: $8704.
To find the dimensions of the crate that will minimize the total cost of material, we need to use optimization techniques, we need to express the cost of materials in terms of x and y then calculate the cost of all four sides, then find the minimum cost.
Let's start by defining the variables we need to work with:
Let x be the length of one side of the square base (in feet), Let y be the height of the crate (in feet).
From the given volume, we know that:
V = x^2 * y = 12288 ft^3
We can use this equation to solve for one of the variables in terms of the other:
y = 12288 / (x^2)
Now we need to express the cost of materials in terms of x and y.
The area of the bottom is x^2, so the cost of the bottom is:
[tex]C_b = 10 * x^2[/tex]
The area of each side is x * y, and there are four sides, so the cost of the sides is:
[tex]C_s = 4 * 2 * x * y = 8xy[/tex]
The area of the top is also x^2, so the cost of the top is:
[tex]C_t = 2 * x^2[/tex]
The total cost of materials is the sum of these three costs:
[tex]C = C_b + C_s + C_t = 10x^2 + 8xy + 2x^2[/tex]
Now we can substitute y = 12288 / (x^2) into this equation:
[tex]C = 10x^2 + 8x * (12288 / x^2) + 2x^2[/tex]
Simplifying this expression, we get:
[tex]C = 12x^2 + 98304 / x[/tex]
To find the minimum cost, we need to find the value of x that minimizes this expression. We can do this by taking the derivative of C with respect to x and setting it equal to zero:
C' = 24x - 98304 / x^2 = 0
Solving for x, we get:
x = 16 ft
Now we can use this value of x to find y:
y = 12288 / (16^2) = 48 ft
Therefore, the dimensions of the crate that will minimize the total cost of material are:
- Length of one side of the square base = x = 16 ft
- Height of the crate = y = 48 ft
To check that this is indeed the minimum cost, we can plug these values back into the expression for C and calculate the cost:
C = 10 * 16^2 + 8 * 16 * 48 + 2 * 16^2 = 8704
Therefore, the minimum cost of material for the crate is $8704.
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Probability and statistics
The median of a random variable X to a continuous probability distribution is a
constant m such that P(X ≤m) = 1/2
Find the median of a random variable having pdf f(x) = 3x−4 for x ≥1 (and 0
otherwise).
The median of the random variable X with pdf f(x) = 3x−4 for x ≥1 (and 0 is approximately 1.482.
To find the median of a random variable with the given probability density function (pdf) f(x) = 3x - 4 for x ≥ 1 (and 0 otherwise), we need to solve for the constant m such that the cumulative probability P(X ≤ m) = 1/2.
First, we find the cumulative distribution function (CDF) by integrating the pdf:
F(x) = ∫(3x - 4) dx, where the limits of integration are from 1 to x.
F(x) = [(3/2)x² - 4x] evaluated from 1 to x.
Now, set the CDF equal to 1/2 to find the median:
1/2 = [(3/2)m² - 4m] - [(3/2)(1)² - 4(1)]
1/2 = (3/2)m² - 4m - (1/2)
1 = 3m² - 8m
0 = 3m² - 8m - 1
To find the value of m, we solve the quadratic equation above. Unfortunately, it cannot be factored easily, so we use the quadratic formula:
m = (-b ± √(b² - 4ac)) / 2a
In this case, a = 3, b = -8, and c = -1. Plugging in these values:
m ≈ (8 ± √(64 + 12)) / 6 ≈ 1.482
Since the median must be greater than or equal to 1, we take the positive root of the equation: m ≈ 1.482. Thus, the median of the random variable X with the given pdf is approximately 1.482.
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A die is rolled twice. What is the probability of rolling a 5 or getting an even number?
2/3
1/12
3/1
Answer:
4/6 or 2/3
Step-by-step explanation:
probability is successful out of total. The total is 1,2,3,4,5,6, or 6 ways, and the successful is 2,4,5,6, or 4 ways
The american institute of certified tax planners reports that the average u.s. cpa works 60 hours per week during tax season. do cpas in states that have flat state income tax rates work fewer hours per week during tax season? conduct a hypothesis test to determine if this is so.
a. formulate hypotheses that can be used to determine whether the mean hours worked per week during tax season by cpas in states that have flat state income tax rates is less than the mean hours worked per week by all u.s. cpas during tax season?
b. based on a sample, the mean number of hours worked per week during tax season by cpas in states with flat tax rates was 55. assume the sample size was 150 and that, based on past studies, the population standard deviation can be assumed to be σ = 27.4. use the sample results to compute the test statistic and p-value for your hypothesis test.
c. at α = .05, what is your conclusion?
a. Null hypothesis (H0): μ1 = μ2 and Alternative hypothesis (H1): μ1 < μ2. b. The test statistic is -2.57 and p-value is 0.005 for the hypothesis test. c. At α = 0.05 it can be concluded that CPAs in states with flat state income tax rates work fewer hours per week during tax season compared to the average U.S. CPAs.
a. First, let's formulate the hypotheses:
Null hypothesis (H0): μ1 = μ2, which means that the mean hours worked per week during tax season by CPAs in states with flat state income tax rates is equal to the mean hours worked per week by all U.S. CPAs during tax season.
Alternative hypothesis (H1): μ1 < μ2, which means that the mean hours worked per week during tax season by CPAs in states with flat state income tax rates is less than the mean hours worked per week by all U.S. CPAs during tax season.
b. Now, let's compute the test statistic and p-value using the given sample data:
Sample mean (x) = 55 hours
Population mean (μ) = 60 hours
Population standard deviation (σ) = 27.4 hours
Sample size (n) = 150
We'll use the z-test for this hypothesis test:
z = (x - μ) / (σ / √n) = (55 - 60) / (27.4 / √150) ≈ -2.57
To find the p-value, we need to look up the z-value in the standard normal table, which gives us a p-value of approximately 0.005.
c. Lastly, let's draw our conclusion using α = 0.05:
Since the p-value (0.005) is less than α (0.05), we reject the null hypothesis (H0). This suggests that CPAs in states with flat state income tax rates work fewer hours per week during tax season compared to the average U.S. CPAs.
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Write an expression for the arc length of the rose r = cos 3θ. SET UP ONLY. Do not simplify.
L = ∫√(cos^2(3θ) + 9sin^2(3θ)) dθ.
This expression represents the arc length of the rose curve r = cos(3θ).
To understand how to set up an expression for the arc length of the rose curve r = cos(3θ), we first need to understand the concept of arc length in polar coordinates.
In Cartesian coordinates, the distance between two points can be calculated using the Pythagorean theorem. However, in polar coordinates, the distance between two points is given by the arc length formula, which involves integrating a function.
Consider a curve defined by the polar equation r = f(θ). To find the arc length of the curve between two angles θ1 and θ2, we divide the interval [θ1, θ2] into small pieces, and approximate the length of each piece as the hypotenuse of a right triangle.
The base of the triangle is a small change in θ, and the height is a small change in r. By taking the limit as the length of the intervals goes to zero, we can integrate to find the exact length of the curve.
The arc length formula for polar coordinates is given by:
L = ∫√(r^2 + (dr/dθ)^2) dθ.
This formula calculates the length of the curve r = f(θ) between θ1 and θ2. The expression inside the square root is the Pythagorean theorem for polar coordinates, and dr/dθ is the derivative of r with respect to θ.
Now, let's use this formula to find the arc length of the rose curve r = cos(3θ).
First, we need to find the derivative of r with respect to θ, which is given by:
dr/dθ = -3sin(3θ).
Now, we can plug in r and dr/dθ into the arc length formula:
L = ∫√((cos(3θ))^2 + (-3sin(3θ))^2) dθ.
Simplifying the expression inside the square root, we get:
L = ∫√(cos^2(3θ) + 9sin^2(3θ)) dθ.
This expression represents the arc length of the rose curve r = cos(3θ). By evaluating this integral between the appropriate limits of integration, we can find the exact length of the curve.
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Karoline needs to jog 30.5
miles over the next 7
days to train for a race.
She plans to jog 4.25
miles each day.
Answer: 7x=30.5
Step-by-step explanation: If you were to answer this equation with the given information it would not be correct. 7(4.25)=29.75. You need to go through BEDMAS to answer this.
You what you need to do is divide 30.5 by 7 to get the amount she needs to jog for a week, if you do that you get 4.37 miles each day to get to 30.5 in a week.
Classify each angle pair as corresponding, alternate interior, alternate exterior, or consecutive interior angles
Corresponding angles have the same position on the parallel lines, alternate interior angles are inside and opposite, alternate exterior angles are outside and opposite, and consecutive interior angles are on the same side.
When two parallel lines are intersected by a transversal, there are several types of angle pairs that are formed. Corresponding angles are pairs of angles that are located in the same position on the parallel lines relative to the transversal. They have the same measure and are congruent.
Alternate interior angles are pairs of angles that are located on opposite sides of the transversal and inside the parallel lines. They are congruent and have the same measure. Alternate exterior angles are pairs of angles that are located on opposite sides of the transversal and outside the parallel lines. They are congruent and have the same measure.
Consecutive interior angles are pairs of angles that are located on the same side of the transversal and inside the parallel lines. They add up to 180 degrees.
To classify each angle pair, we need to determine their positions relative to the parallel lines and the transversal. By knowing the classifications, we can identify each angle pair and their properties.
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DON'T GIVE FAKE ANSWERS OR I'LL REPORT!
What is the area of a sector with a central angle of 45° and a diameter of 5. 6 in. ? Use 3. 14 for π and round your final answer to the nearest hundredth. Enter your answer as a decimal in the box. What is the area of a sector with a central angle of 120° and a radius of 18. 4 m? Use 3. 14 for π and round your final answer to the nearest hundredth. Enter your answer as a decimal in the box
The area of a sector with a central angle of 45° and a diameter of 5.6 in. is 1.23 square inches.
To see why, you can use the formula for the area of a sector, which is:
A = (θ/360) x π x r^2
where θ is the central angle in degrees, r is the radius, and π is approximately 3.14.
First, you need to find the radius of the sector, which is half of the diameter:
r = d/2 = 5.6/2 = 2.8 in.
Next, you can plug in the values for θ and r into the formula:
A = (45/360) x 3.14 x 2.8^2 = 1.23 square inches
Therefore, the area of the sector is 1.23 square inches.
The area of a sector with a central angle of 120° and a radius of 18.4 m is 1908.57 square meters.
To see why, you can use the same formula for the area of a sector:
A = (θ/360) x π x r^2
First, you need to convert the radius from meters to centimeters, since π is in terms of centimeters:
r = 18.4 m x 100 cm/m = 1840 cm
Next, you can plug in the values for θ and r into the formula:
A = (120/360) x 3.14 x 1840^2 = 1908.57 square meters
Therefore, the area of the sector is 1908.57 square meters.
300 high school students were asked how many hours of tv they watch per day. the mean was 2 hours, with a standard deviation of 0. 5. using a 90% confidence level, calculate the maximum error of estimate.
0. 27%
5. 66%
7. 43%
4. 75%
The maximum error of estimate is 4.75%.
To calculate the maximum error of estimate for the given problem, we will use the formula for margin of error:
Margin of Error = Z-score * (Standard Deviation / √n)
Where:
- Z-score corresponds to the 90% confidence level, which is 1.645
- Standard Deviation is 0.5 hours
- n is the sample size, which is 300 students
Margin of Error = 1.645 * (0.5 / √300) ≈ 0.0475
To express this as a percentage, multiply by 100:
0.0475 * 100 ≈ 4.75%
Thus, the maximum error of estimate with a 90% confidence level is 4.75%.
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April’s grandmother bought her a set of Russian dolls from St. Petersburg. The dolls stack inside of each other and are similar to each other. The diameters of the two smallest dolls are 1. 9 cm and 2. 85 cm. The scale factor is the same from one doll to the next. April estimates that the volume of the smallest doll is 7 cm^ 3. Determine the volume of the 4th doll
The volume of the 4th doll is approximately [tex]130.1 cm^3.[/tex]
The diameter of the smallest doll is 1.9 cm, so its radius is 0.95 cm (half of the diameter).
Similarly, the radius of the second smallest doll is (2.85/2) = 1.425 cm.
Since the scale factor is the same from one doll to the next, the ratio of the radius of the second smallest doll to the radius of the smallest doll is:
1.425 cm / 0.95 cm = 1.5
Similarly, the ratio of the radius of the third smallest doll to the radius of the second smallest doll is also 1.5.
Using this pattern, we can find the radius of the 4th doll as:
Radius of 4th doll = 1.5 × (Radius of 3rd doll) = 1.5 × 2.1375 cm = 3.2063 cm (rounded to 4 decimal places)
The volume of the 4th doll can then be calculated as:
Volume of 4th doll = (4/3) × π ×[tex](Radius of 4th doll)^3[/tex]
= (4/3) × π × [tex](3.2063 cm)^3[/tex]
≈ [tex]130.1 cm^3[/tex]
Therefore, the volume of the 4th doll is approximately [tex]130.1 cm^3.[/tex]
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Diversifying Your Savings Portfolio 1.2
You saved $30,000.00 and want to diversify your monies. You invest 40% in a
Treasury bond for 3 years at 5.35% APR compounded annually You place 10% in a CD
at 4.75% APR for 3 years compounded annually 30% you invest in a stock plan and
the remainder is in a savings account at 3.90% APR compounded annually. The stock
plan increases 9% the first year, decreases in value by 5% the second year, and
increases by 7% the thind year.
1. What are the balances for each type of investment a
year?
2. What is your total gain from all of the investments combined?
of the thind
3. If you had invested 40% in stock and 30% in Treasury bonds, would you have
more or less of a gain after the three years?
Be sure to include in your response:
Detailed calculations for each type of investment.
Answers to the original questions.
Answer:
ChatGPT
To find the balances for each type of investment after one year, we can use the formula for compound interest:
Treasury bond: A = P(1 + r/n)^(nt)
A = 0.4(30000)(1 + 0.0535/1)^(1*1) = $12,912.00
CD: A = P(1 + r/n)^(nt)
A = 0.1(30000)(1 + 0.0475/1)^(1*1) = $10,316.25
Stock plan: After the first year, 30% is still in the savings account. The other 70% is in the stock plan, which increased by 9%, so the new value is:
0.7(30000)(1 + 0.09) = $23,940.00
Savings account: A = P(1 + r/n)^(nt)
A = 0.2(30000)(1 + 0.039/1)^(1*1) = $6,351.00
To find the total gain from all of the investments combined, we need to add up the gains from each investment:
Treasury bond: $12,912.00 - $12,000.00 = $912.00 gain
CD: $10,316.25 - $9,000.00 = $1,316.25 gain
Stock plan: After the second year, the stock plan decreased in value by 5%, so the new value is:
0.7($23,940.00)(1 - 0.05) = $19,149.00
After the third year, the stock plan increased by 7%, so the final value is:
0.7($19,149.00)(1 + 0.07) = $20,129.57
The gain from the stock plan is:
$20,129.57 - $21,000.00 = -$870.43 loss (since the stock plan decreased in value overall)
Savings account: $6,351.00 - $6,000.00 = $351.00 gain
Total gain = $912.00 + $1,316.25 - $870.43 + $351.00 = $708.82
If you had invested 40% in stock and 30% in Treasury bonds, the calculations would be:
Treasury bond: A = P(1 + r/n)^(nt)
A = 0.3(30000)(1 + 0.0535/1)^(1*3) = $12,853.81
Stock plan: After the first year, 40% is still in the savings account. The other 60% is in the stock plan, which increased by 9%, so the new value is:
0.6(30000)(1 + 0.09) = $16,200.00
After the second year, the stock plan decreased in value by 5%, so the new value is:
0.6($16,200.00)(1 - 0.05) = $15,390.00
After the third year, the stock plan increased by 7%, so the final value is:
0.6($15,390.00)(1 + 0.07) = $16,019.16
Total gain = ($12,853.81 - $12,000.00) + (-$981.84) + ($1,019.16) = $890.13
Therefore, investing 40% in stock and 30% in Treasury bonds
PLS HELP ME FAST!!!
Write an expression for the sequence of operations described below. Subtract 5 from 7, then divide 3 by the result.Type x if you want to use a multiplication sign. Type / if you want to use a division sign. Do not simplify any part of the expression.
Answer:
3 / (7-5)
Step-by-step explanation:
"Subtract 5 from 7"
When you're subtracting from something, the reverse the order of the numbers. So, the expression here would be "7 - 5"
"Then, divide 3 by the result."
Here, you're dividing 3 by the result, so the 3 must be in the numerator (on top of the fraction), and the "result from the previous step must be in the denominator (on the bottom of the fraction). So, the expression here would be "3 / result"
Since order of operations forces division to happen before subtraction, we'll need parentheses around the first result to force the subtraction to happen first, as instructed.
So, the final expression would be "3 / (7-5)"
15. A machine in a factory cuts out triangular sheets of metal. Which
of the triangles are right triangles? Select all that apply.
Triangle 1
Triangle 2
Triangle Side Lengths
Triangle Side Lengths (in. )
1
12 19 505
2
16 19 1467
3
14 20 596
Triangle 3
Triangle 4
4
11
23
1421
Using Pythagorean theorem, none of the triangles given are right triangles.
To determine which of the triangles are right triangles, you can use the Pythagorean theorem (a² + b² = c²), where a and b are the shorter side lengths and c is the longest side (hypotenuse).
Triangle 1:
Side lengths: 12, 19, 505
Checking: 12² + 19² = 144 + 361 = 505 ≠ 505²
Triangle 1 is not a right triangle.
Triangle 2:
Side lengths: 16, 19, 1467
Checking: 16² + 19² = 256 + 361 = 617 ≠ 1467²
Triangle 2 is not a right triangle.
Triangle 3:
Side lengths: 14, 20, 596
Checking: 14² + 20² = 196 + 400 = 596 ≠ 596²
Triangle 3 is not a right triangle.
Triangle 4:
Side lengths: 11, 23, 1421
Checking: 11² + 23² = 121 + 529 = 650 ≠ 1421²
Triangle 4 is not a right triangle.
None of the triangles given are right triangles.
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There are 43 children at a school. they want to make teams with 8 children on each team for kickball. one of the children goes home. how many complete teams can they make? explain.
Answer:
They can make 5 complete teams of 8 children even after one child goes home.
Step-by-step explanation:
If there are 43 children and they want to make teams of 8, we can find out how many complete teams they can make by dividing the total number of children by the number of children per team:
43 ÷ 8 = 5 remainder 3This means that they can make 5 complete teams of 8 children, with 3 children left over.
However, since one child goes home, there are only 42 children left. We can repeat the division:
42 ÷ 8 = 5 remainder 2This means that they can make 5 complete teams of 8 children, with 2 children left over. Therefore, they can make 5 complete teams of 8 children even after one child goes home.
The domain of g(x) = log 56 - x) can be found by solving the inequality
A. 6-x<0 ,B. 6-x>0,C. 6-x>=0, D. 6-x<=0
The inequality to solve is 56 - x > 0. The solution is x < 56. Therefore, the domain of the function g(x) is x < 56. So, the answer is option B.
The function is defined as g(x) = log(56 - x).
The domain of a logarithmic function is all the values that make the argument of the logarithm positive. In other words, the argument of the logarithm (56 - x) must be greater than 0.
So, we solve the inequality 56 - x > 0 for x
56 - x > 0
Subtract 56 from both sides
-x > -56
Divide both sides by -1, and remember to reverse the inequality
x < 56
Therefore, the domain of the function g(x) is all real numbers x such that x < 56. So, the correct answer is B).
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--The given question is incomplete, the complete question is given
" The domain of g(x) = log 56 - x) can be found by solving the inequality
A. 56-x<0 ,B. 56-x>0,C. 56-x>=0, D. 56-x<=0 "--
Find the equation of the tangent line to the curve y = x⁴ + 6eˣ at the point (0.6).
y = ...
The equation of the tangent line to the curve is y = 8.013x - 1.185.
How to find the equation of the tangent line to the curve at the point ?To find the equation of the tangent line to the curve at the point (0.6), we first need to find the slope of the tangent line, which is the derivative of the curve at that point.
Taking the derivative of y = x⁴ + 6eˣ, we get:
y' = 4x³ + 6eˣ
Now, we can find the slope of the tangent line at x = 0.6 by plugging in this value into the derivative:
y'(0.6) = 4(0.6)³ + 6e⁰.⁶ ≈ 8.013
So the slope of the tangent line at the point (0.6) is approximately 8.013.
Next, we need to find the y-coordinate of the point on the curve at x = 0.6. Plugging this value into the original equation, we get:
y = (0.6)⁴ + 6e⁰.⁶ ≈ 6.976
So the point on the curve that corresponds to x = 0.6 is approximately (0.6, 6.976).
Finally, we can use the point-slope form of the equation of a line to find the equation of the tangent line:
y - 6.976 = 8.013(x - 0.6)
Simplifying, we get:
y = 8.013x - 1.185
So the equation of the tangent line to the curve y = x⁴ + 6eˣ at the point (0.6) is y = 8.013x - 1.185.
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In circle K with \text{m} \angle JKL= 90m∠JKL=90, find the \text{m} \angle JMLm∠JML
The measure of angle JML is 180 degrees because in a circle, an angle formed by two chords intersecting inside the circle.
How to find the measurement of angle?In a circle, the measurement of angle formed by two chords intersecting inside the circle is half the sum of the arcs intercepted by the angle. Using this property, we can find the measure of angle JML.
Since angle JKL is a right angle, its intercepted arc is the diameter of the circle. Therefore, its measure is 180 degrees.
By the same property, we know that angle JML is half the sum of the arcs intercepted by it. The arcs intercepted by angle JML are arcs JL and KM.
Since angle JKL is a right angle, arc JL is also 180 degrees.
Since J, K, L, and M are concyclic, we know that angle JKM is supplementary to angle JLM. Therefore, arc KM is the supplement of arc JL and has measure 360 - 180 = 180 degrees.
Thus, the sum of the intercepted arcs is 180 + 180 = 360 degrees, and angle JML is half of this, so its measure is 180 degrees.
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A factory makes light fixtures with right regular hexagonal prisms where the edge of a hexagonal base measures 4 centimeters and the lengths of the prisms vary. It costs $0. 04 per square centimeter to fabricate the prisms and the factory owner has set a limit of $11 per prism. What is the maximum length of each prism?
The maximum surface area for a prism is.
So, the maximum length for a prism is cm
The maximum length of each prism is equal to 7.99 centimeter.
Maximum surface area = 275 square centimeter (cm²).
Given, Light fixtures of regular hexagonal prism .
Determine the maximum surface area of this regular hexagonal prism by using this mathematical expression:
Maximum surface area (quantity) = Cost/unit price
Maximum surface area (quantity) = $11/$0.04
Maximum surface area (quantity) = 275 square centimeter (cm²).
Mathematically, the surface area of a regular hexagonal prism can be calculated by using this formula:
[tex]A = 6al + 3\sqrt{3} a^2[/tex]
Where:
A represents the surface area of a regular hexagonal prism.
a represents the edge length (apothem) of a regular hexagonal prism.
l represents the length of a regular hexagonal prism.
Substituting the given parameters into the formula, we have;
[tex]275 = 6 \times 4l + (3\sqrt{3} \times 4^2)[/tex]
[tex]275 = 24l + 48\sqrt{3} \\24l = 275 - 48\sqrt{3}\\ 24l = 191.8616\\l = 191.8616/24[/tex]
Length, l = 7.99 centimeter.
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8. you will be listed as a negligent operator if you get:
a. all of the answers are correct
b. 8 points within any 36-month period
6 points within any 24-month period
4 points within any 12-month period
The correct answer is: b
8 points within any 36-month period
6 points within any 24-month period
4 points within any 12-month period
In most US states, drivers are assigned points for certain traffic violations or accidents. If a driver accumulates too many points within a certain period of time, they may be labeled as a "negligent operator" and face penalties such as license suspension or revocation. The point thresholds for being labeled as a negligent operator may vary by state, but the options given in the question are generally accurate.
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is root 9 /25 a rational number?
Answer:
Yes
Step-by-step explanation:
9/25
√9/√25 = 3/5 = 0.6
so it is a rational number because it has an integer as a denominator also because the decimal is not reoccurring
Answer: Yes
Step-by-step explanation:
Yes.
9/25 = .36
Because the decimal stop it is rational
Only decimals that have no pattern and go on infinitely then it is irrational like [tex]\pi[/tex] or √7 if you plug those into a calculator they go on forever and have no pattern
Jim is building a deck for his family to enjoy. Because of a big bay window that juts out next to the deck, he has to build an angled section for the steps going down to the yard. The section will be a parallelogram. Assuming that he cannot accurately prove that any two sides are parallel, how can he be assured that he has an actual parallelogram? Identify the theorem that he will use and how he will use it
By applying the Consecutive Angles Theorem, Jim can confirm that the angled section for the steps is indeed a parallelogram, even without accurately proving that any two sides are parallel.
Jim building a deck with an angled section in the shape of a parallelogram. To be assured that he has an actual parallelogram, Jim can use the Consecutive Angles Theorem.
This theorem states that if the consecutive angles of a quadrilateral are supplementary (add up to 180 degrees), then the quadrilateral is a parallelogram.
To use the Consecutive Angles Theorem, Jim should follow these steps:
1. Measure the four angles of the quadrilateral he has created for the angled section of the deck.
2. Check if the consecutive angles are supplementary (i.e., the sum of each pair of consecutive angles is equal to 180 degrees).
3. If all consecutive angles are supplementary, he can be assured that the quadrilateral is a parallelogram.
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Sam, Mike, and Cindy are in a lottery drawing for housing with 40 other students to choose their dorm rooms. If the students are chosen in random order, what is the probability that Sam is chosen first, Mike second, and Cindy third?
A. 1/20,760
B. 37!/40
C. 1/59,280
D. 3/40
The probability that Sam is chosen first, Mike second, and Cindy third in a random order is 37!/40 (Option B).
The question is: Sam, Mike, and Cindy are in a lottery drawing for housing with 40 other students to choose their dorm rooms. If the students are chosen in random order, what is the probability that Sam is chosen first, Mike second, and Cindy third?
To find the probability, we need to consider the total possible ways the students can be chosen and the specific arrangement we want (Sam first, Mike second, and Cindy third). There are a total of 43 students, so there are 43! (43 factorial) ways to arrange them.
For the specific arrangement we want:
- There is 1 way to choose Sam first (out of 43 students).
- After choosing Sam, there is 1 way to choose Mike second (out of the remaining 42 students).
- After choosing Mike, there is 1 way to choose Cindy third (out of the remaining 41 students).
So, there is a total of 1 × 1 × 1 = 1 way to have the specific arrangement we want.
Now, we can calculate the probability by dividing the number of ways to get the specific arrangement by the total number of arrangements:
Probability = (1 way for the specific arrangement) / (43! total arrangements) = 1/(43!)
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the probability that a student takes algebra two is 8%. The probability that a student who is taking algebra two will also be taking chemistry is 17%. what is the probability that a randomly selscted student will take both algebra two and chemistry?
Answer:The probability that a student takes algebra 2 = 8%
Step-by-step explanation: hope it helps :)