All the dimensions of a cube increase by a factor 3/2 how many times greater is the surface area? explain
If all the dimensions of a cube increase by a factor of 3/2, the surface area will increase by a factor of 9/2.
If all the dimensions of a cube increase by a factor of 3/2, then the new dimensions of the cube will be 3/2 times the original dimensions.
Let's say the original side length of the cube was "s". Then the new side length would be (3/2)*s.
The surface area of a cube is given by the formula 6s^2, where s is the side length.
So the original surface area of the cube would be:
6s^2
And the new surface area of the cube would be:
6(3/2s)^2
= 6(9/4)s^2
= 27/2 s^2
To find how many times greater the new surface area is compared to the original surface area, we can divide the new surface area by the original surface area:
(27/2 s^2) / (6s^2)
= (9/2)
So the new surface area is 9/2 times greater than the original surface area.
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If a point is randomly located on an interval (a, b) and if y denotes the location of the point, then y is assumed to have a uniform distribution over (a, b). a plant efficiency expert randomly selects a location along a 500-foot assembly line from which to observe the work habits of the workers on the line. what is the probability that the point she selects is:closer to the beginning of the line than to the end of the line
The probability that the point she selects is closer to the beginning of the line than to the end of the line is 0.5 or 50%.
If a point is randomly located on an interval (a, b), and y denotes the location of the point, then y is assumed to have a uniform distribution over (a, b). In this case, the interval is the assembly line of length 500 feet, where a is the beginning and b is the end of the line.
The question asks for the probability that the point she selects is closer to the beginning of the line than to the end of the line. For the point to be closer to the beginning, it must be located in the first half of the line, which is an interval of length 250 feet (500/2).
Since the point has a uniform distribution, the probability of the point being within any sub-interval is equal to the length of the sub-interval divided by the total length of the interval (500 feet).
So, the probability that the point she selects is closer to the beginning of the line than to the end of the line is the length of the first half (250 feet) divided by the total length (500 feet).
Probability = (Length of the first half) / (Total length)
Probability = (250 feet) / (500 feet)
Probability = 0.5 or 50%
There is a 50% chance that the place she chooses will be closer to the line's beginning than its finish.
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Which expression represents the second partial sum for ? 2(0. 4) + 2(0. 4)2 2(0. 4)2 + 2(0. 4)3 2 + 2(0. 4) 0 + 2(0. 4)1
timed
The expression represents the second partial sum for 2(0. 4) + 2(0. 4)2 2(0. 4)2 + 2(0. 4)3 2 + 2(0. 4) 0 + 2(0. 4)1 is 0.8.
The second partial sum of a sequence refers to the sum of the first two terms of the sequence.
The given sequence is: 2(0.4) + 2(0.4)^2 + 2(0.4)^2 + 2(0.4)^3 + 2(0.4)^0 + 2(0.4)^1
To find the second partial sum, we simply add the first two terms of the sequence:
2(0.4) + 2(0.4)^2 = 0.8
Therefore, the expression that represents the second partial sum for the given sequence 2(0. 4) + 2(0. 4)2 2(0. 4)2 + 2(0. 4)3 2 + 2(0. 4) 0 + 2(0. 4)1 is 0.8.
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(c) Katrina recorded the average rainfall amount, in inches, for two cities over the course of 6 months. City A: {5, 2. 5, 6, 2008. 5, 5, 3} City B: {7, 6, 5. 5, 6. 5, 5, 6} (a) What is the mean monthly rainfall amount for each city? (b) What is the mean absolute deviation (MAD) for each city? Round to the nearest tenth. (c) What is the median for each city?
a) The mean monthly rainfall amount for City A is 334.17 inches and for City B is 5.83 inches.
b) The MAD for City A is 464.28 inches and for City B is 0.46 inches.
c) The median for City A is 5 inches and for City B is 6 inches.
(a) To find the mean monthly rainfall amount for each city, we need to add up all the rainfall amounts and divide by the number of months:
For City A: (5 + 2.5 + 6 + 2008.5 + 5 + 3) / 6 = 334.17 inches
For City B: (7 + 6 + 5.5 + 6.5 + 5 + 6) / 6 = 5.83 inches
(b) To find the mean absolute deviation (MAD) for each city, we need to find the absolute deviations from the mean for each data point, then calculate the average of those absolute deviations:
For City A:
Mean = 334.17 inches
Absolute deviations from the mean: |5 - 334.17| = 329.17, |2.5 - 334.17| = 331.67, |6 - 334.17| = 328.17, |2008.5 - 334.17| = 1674.33, |5 - 334.17| = 328.17, |3 - 334.17| = 331.17
MAD = (329.17 + 331.67 + 328.17 + 1674.33 + 328.17 + 331.17) / 6 = 464.28 inches
For City B:
Mean = 5.83 inches
Absolute deviations from the mean: |7 - 5.83| = 1.17, |6 - 5.83| = 0.17, |5.5 - 5.83| = 0.33, |6.5 - 5.83| = 0.67, |5 - 5.83| = 0.83, |6 - 5.83| = 0.17
MAD = (1.17 + 0.17 + 0.33 + 0.67 + 0.83 + 0.17) / 6 = 0.46 inches
(c) To find the median for each city, we need to arrange the data points in order and find the middle value:
For City A: {2.5, 3, 5, 5, 6, 2008.5}
Median = 5 inches
For City B: {5, 5.5, 6, 6, 6.5, 7}
Median = 6 inches
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What is the vertex and axis of symmetry for this graph
Answer: (1,9) and x=1
Step-by-step explanation: vertex is also known as the turning point of the graph, which is the point at which the gradient of the graph changes sign in this case it is the coordinate (1,9)
axis of symmetry is an equation of a line which will split the graph into two symmetrical parts as in two parts that can reflected and laterally inverted showing no changes. in this case, the line would pass through the vertex vertically which is the line with a gradient of 1 not passing the through the y axis so it equals x=1
3 + v = 2 (2v -1) -----------
Solve 2^{3-x} + 2^{x+1} =17
Log x + log (x+3) = 1
To solve the equation [tex]2^{3-x} + 2^{x+1} = 17[/tex] and the equation log x + log (x+3) = 1, We get the solution to the system of equations is x = 2. To check if x = 2 satisfies the first equation [tex](2^{3-x} + 2^{x+1} = 17).[/tex]
Solve the first equation, [tex]2^{3-x} + 2^{x+1} = 17.[/tex] Rewrite the equation as[tex]2^{3-x} = 17 - 2^{x+1}.[/tex] Take the logarithm of both sides (base 2): [tex]3-x = log2(17 - 2^{x+1})[/tex]. Rewrite the equation as [tex]x = 3 - log2(17 - 2^{x+1}).[/tex]
Solve the second equation, log x + log (x+3) = 1. Combine the logarithms: log(x(x+3)) = 1. Remove the logarithm by taking the exponent of both sides: x(x+3) = 10. The equation: x^2 + 3x = 10. Rearrange to form a quadratic equation:[tex]x^2 + 3x - 10 = 0.[/tex]
Factor the quadratic equation: (x+5)(x-2) = 0. Set each factor to zero: x+5 = 0 or x-2 = 0. Solve for x: x = -5 or x = 2. The solutions. Check if x = -5 satisfies the first equation [tex](2^{3-x} + 2^{x+1} = 17).[/tex]([tex]2^{3-x} + 2^{x+1} = 17)[/tex]. If it does not, discard it.
The solution to the system of equations is x = 2.
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What percent of his monthly budget do his transportation costs account for?
To calculate the percentage of one's monthly budget that transportation costs account for, we need to know the total amount of money spent on transportation and the total monthly budget.
Let's say, for example, that John spends $500 per month on transportation and his monthly budget is $2,000.
To calculate the percentage, we would divide the amount spent on transportation by the total monthly budget and then multiply by 100 to get the percentage. So, in this case, the calculation would be:
[tex]($500 / $2,000) x 100 = 25%[/tex]
Therefore, John's transportation costs account for 25% of his monthly budget. This is a significant portion of his budget, and if he needs to save money, he may want to consider alternative modes of transportation such as carpooling,
public transportation, or biking. It's always important to keep track of expenses and prioritize spending in order to maintain a healthy financial situation.
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You roll a six-sided number cube and flip a coin. What is the probability of rolling a number greater than 1 and flipping heads?
Answer:80%
Step-by-step explanation:
The student council is planning for the prom. They have broken down their expenses in the graph below. If they decide they will spend $1200 in refreshments, then what is their total budget?
The total budget of the prom, using the percentage concept, is given by = $ 4000.
Hence the correct option is (D).
Let the total budget be $ 100x.
Spending on Entertainment is 25% of the Budget.
So the spending on Entertainment = 100x*(25/100) = $ 25x.
Spending on Refreshments is 30% of the Budget.
So the spending on Refreshments = 100x*(30/100) = $ 30x.
Spending on Decorations is 45% of the Budget.
So the spending on Decorations = 100x*(45/100) = $ 45x.
It is also given that the spending on refreshments in dollar is $ 1200.
According to information,
30x = 1200
x = 1200/30
x = 40
Hence the total budget is = $100x = $ 100*40 = $ 4000.
So the correct option is (D).
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The question is incomplete. The complete question will be -
"The student council is planning for the prom. They have broken down their expenses in the graph below. If they decide they will spend $1,200 on refreshments, then what is their total budget?
Prom Budget:
Entertainment: 25%
Refreshments: 30%
Decorations: 45%
Answer choices:
A. $3,600
B. $6,000
C. $7,200
D. $4,000"
A proportional relationship is shown in the table below:
x - 0, 3, 6, 9, 12
y - 0, 0.5, 1.0, 1.5, 2.0
What is the slope of the line that represents this relationship?
Graph the line that represents this relationship.
The slope of the line that represents the proportional relationship between x and y in the given table is 1/6. To graph the line, we can plot the points from the table and connect them with a straight line passing through the origin (0,0).
The relationship between x and y is proportional, which means that there is a constant ratio between the two variables. We can find the slope of the line that represents this relationship by calculating the ratio of the change in y over the change in x between any two points on the line. Let's use the first and last points
slope = (y2 - y1) / (x2 - x1) = (2.0 - 0) / (12 - 0) = 2/12 = 1/6
So, the slope of the line that represents this proportional relationship is 1/6.
To graph the line, we can plot the points from the table and connect them with a straight line. The line will pass through the origin (0,0) and have a slope of 1/6. The graph will look like.
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Carson decides to estimate the volume of a coffee cup by modeling it as a right cylinder. Carson measures its circumference as 15.1 cm and its volume as 161 cubic centimeters. Find the height of the cup in centimeters. Round your answer to the nearest tenth if necessary.
please help ;-;
To find the height of the coffee cup, we can use the formula for the volume of a cylinder:
V = πr^2h
where V is the volume, r is the radius, and h is the height.
We are given that the circumference of the coffee cup is 15.1 cm. The formula for the circumference of a cylinder is:
C = 2πr
where C is the circumference and r is the radius.
We can use this formula to find the radius of the coffee cup:
15.1 cm = 2πr
r = 15.1 cm / (2π)
r ≈ 2.4 cm
Now we can use the given volume and radius to find the height of the coffee cup:
161 cm^3 = π(2.4 cm)^2h
h = 161 cm^3 / (π(2.4 cm)^2)
h ≈ 4.0 cm
Therefore, the height of the coffee cup is approximately 4.0 cm.
Mason plays a game by flipping a fair coin. He wins the game if the coin lands facing heads up. If Mason plays 300 times, how many times should he expect to win?
Answer:
Step-by-step explanation:
A fair coin means that there is a 50% probability of heads and a 50% probability of tails.
Playing the game 300 times means that Mason will approach theoretical probability.
Therefore, playing 300 times, he should expect to win 50% of the time, so 50% x 300 = 150 times.
Mason should expect to win 150 times.
 Solve for the value of p
Solve for length of segment c.
In the given diagram, using the intersecting secant theorem, the length of c is 2 cm
Intersecting secant theorem: Calculating the length of cFrom the question, we are to determine the length of segment c
From the intersecting secant theorem, we have that
If two secant segments intersect outside a circle, then the product of the secant segment with its external portion equals the product of the other secant segment with its external portion
Thus,
In the given circle, we can write that
a × b = c × d
Substitute the values
3 × 12 = c × 18
36 = c × 18
Divide both sides by 18
36 / 18 = (c × 18) / 18
2 = c
Therefore,
c = 2
Hence, the length of c is 2 cm
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The table shows the number of hours that a group of friends been in the first week training to run a marathon. In the second week they each add five hours to their training times what are the mean median mode and range of times for the second week
Jeff - 9
Mark - 5
Karen - 5 Costas - 5
Brett - 7
Nikki - 6
Jack - 7
A. Mean is 10
Median is 11 Mode is 11. 3
Range is 4
B. Mean is 11 Median is 11. 3 Mode is 10
Range is 0. 3
C
Mean is 11. 3
Median is 11 Mode is 10
Range is 4
D
Mean is 11. 3
Median is 11 Mode is 10
Range is 0. 3
Please help this is a test question
The mean, median, mode, and range for the second week of training are: Mean is 11.3, median is 11, mode is 10, and range is 4.
What are the mean, median, mode, and range?To find the mean, median, mode, and range for the second week of training, we first need to calculate the new training times by adding five hours to each person's first week time:
Jeff - 9 + 5 = 14
Mark - 5 + 5 = 10
Karen - 5 + 5 = 10
Costas - 5 + 5 = 10
Brett - 7 + 5 = 12
Nikki - 6 + 5 = 11
Jack - 7 + 5 = 12
The new training times for the second week are:
14, 10, 10, 10, 12, 11, 12
To find the mean, we add up all the training times and divide by the number of people:
Mean = (14 + 10 + 10 + 10 + 12 + 11 + 12) / 7
Mean = 11.3
To find the median, we first need to put the training times in order from smallest to largest:
10, 10, 10, 11, 12, 12, 14
The median is the middle value, which in this case is 11.
To find the mode, we need to find the value that occurs most frequently. In this case, there are two modes, which are 10 and 12.
To find the range, we subtract the smallest value from the largest value:
Range = 14 - 10
Range = 4
Therefore, the answer is option C:
Mean is 11.3
Median is 11
Mode is 10
Range is 4
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A data set is normally distributed with a mean of 27 and a standard deviation of 3. 5. Find the z-score for a value of 25, to the nearest hundredth. Z-score =
If a data set is normally distributed with a mean of 27 and a standard deviation of 3. 5, the z-score for a value of 25 is -0.57.
To find the z-score for a value of 25 in a normally distributed data set with a mean of 27 and a standard deviation of 3.5, we use the formula:
z = (x - μ) / σ
where:
x = the given value (25)
μ = the mean (27)
σ = the standard deviation (3.5)
Plugging in the values, we get:
z = (25 - 27) / 3.5
z = -0.57
Rounding to the nearest hundredth, the z-score for a value of 25 is -0.57.
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Ann selects a sample of 29 students at her large high school and finds that 12 of them are planning to travel outside of the state during the coming summer. She wants to construct a confidence interval for p = the proportion of all students at her school who plan on traveling outside of the state during the coming summer, but she realizes she hasn’t met all the conditions for constructing the interval. Which condition for this procedure has she failed to meet?
Ann has failed to meet the condition called the "success-failure" condition.
In order to construct a confidence interval for the proportion (p), the sample must have at least 10 successes (planning to travel outside the state) and 10 failures (not planning to travel outside the state). In her sample of 29 students, she found 12 planning to travel (successes) and 17 not planning to travel (failures). Both numbers satisfy the success-failure condition, so she can construct the confidence interval for the proportion of students planning to travel outside the state during the coming summer.
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Answer:
C: The sample must be a random sample from the population
Step-by-step explanation:
took the test on edge
In 2004, an art collector paid $92,906,000 for a particular painting. The same painting sold for $35,000 in 1950. Complete parts (a) through (d). a) Find the exponential growth rate k, to three decimal places, and determine the exponential growth function V, for which V(t) is the painting's value, in dollars, t years after 1950. V(t) =
The exponential growth function V(t) is:
V(t) ≈ 35,000 * (1.068)^t
To find the exponential growth rate k and the exponential growth function V(t), we can use the formula:
V(t) = V₀ * (1 + k)^t
where V(t) is the value of the painting at time t, V₀ is the initial value of the painting, k is the growth rate, and t is the number of years after 1950.
Given:
Initial value, V₀ = $35,000 (in 1950)
Final value, V(54) = $92,906,000 (in 2004, which is 54 years after 1950)
We can now solve for k:
92,906,000 = 35,000 * (1 + k)^54
Divide both sides by 35,000:
2,654.457 = (1 + k)^54
Now take the 54th root of both sides:
1.068 = 1 + k
Subtract 1 from both sides to find k:
k ≈ 0.068
Now, we can plug k back into the exponential growth function formula:
V(t) = 35,000 * (1 + 0.068)^t
So, the exponential growth function V(t) is:
V(t) ≈ 35,000 * (1.068)^t
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Find the area of a circle with a radius of 4 m two ways. First, find it using the formula for the area of a circle. Then, find it by breaking the circle into equal sectors and rearranging the sectors as a parallelogram. Show all calculations. Use π, instead of an approximation, in your answers. Round to the nearest tenth
Using the formula for the area of a circle:
A = πr^2
A = π(4m)^2
A = 16π
A ≈ 50.3 m^2
Breaking the circle into equal sectors and rearranging the sectors as a parallelogram:
We can break the circle into 8 equal sectors, like this:
[IMAGE: circle with 8 equal sectors]
Each sector is 1/8th of the circle, so its angle is 45°. We can rearrange the sectors to form a parallelogram, like this:
[IMAGE: parallelogram made up of 8 sectors of the circle]
The base of the parallelogram is the same as the circumference of the circle, which is 2πr:
base = 2πr
base = 2π(4m)
base = 8π
The height of the parallelogram is the radius of the circle, which is 4m.
Now we can find the area of the parallelogram:
A = base × height
A = 8π × 4m
A = 32π
A ≈ 100.5 m^2
Finally, we can divide the area of the parallelogram by 8 to get the area of the circle:
A = (area of parallelogram) ÷ 8
A = (32π) ÷ 8
A = 4π
A ≈ 12.6 m^2
Therefore, the area of the circle is approximately 50.3 m^2 (using the formula) or 12.6 m^2 (using the parallelogram method).
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how to convert from kg to m
Answer:
divide by 100
Step-by-step explanation:
hope it helps
Convert 1 Kilograms to Meters (kg to m) with our conversion calculator and conversion tables. To convert 1 kg to m use direct conversion formula below.
Convert 1 Kilograms to Meters (kg to m) with our conversion calculator and conversion tables. To convert 1 kg to m use direct conversion formula below.1 kg = 1 m.
Convert 1 Kilograms to Meters (kg to m) with our conversion calculator and conversion tables. To convert 1 kg to m use direct conversion formula below.1 kg = 1 m.You also can convert 1 Kilograms to other Weight (popular) units.
[tex]Direct \: \: conversion \: \: formula: 1 Kilograms * 1 = 1 Meters[/tex]
You put $4500 into an account earning 6% interest compounded annually.
Write an equation to model the situation
The equation of this model situation with $4500 into an account earning 6% interest compounded annually is 4500(1.06)ᵗ.
The equation to model the situation would be:
A = P(1 + r/n)ⁿᵗ
where A is the amount of money in the account after t years, P is the initial investment (which is $4500), r is the interest rate (which is 6% or 0.06 as a decimal), n is the number of times the interest is compounded per year (in this case, annually), and t is the number of years.
Plugging in the values, the equation becomes:
A = 4500(1 + 0.06/1)ⁿᵗ
Simplifying further, it becomes:
A = 4500(1.06)ᵗ
This equation can be used to find the amount of money in the account after any number of years.
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In a recent poll, 813 adults were asked to identify their favorite seat when they fly, and 520 of them chose a window seat. Use a 0. 01 significance level to test the claim that the majority of adults prefer window seats when they fly. Identify the null hypothesis, alternative hypothesis, test statistic, P-value, conclusion about the null hypothesis, and final conclusion that addresses the original claim. Use the P-value method and the normal distribution as an approximation to the binomial distribution
The P-value is less than the significance level of 0.01, we reject the null hypothesis.
Null Hypothesis: The proportion of adults who prefer window seats when they fly is 0.5 or less.
Alternative Hypothesis: The proportion of adults who prefer window seats when they fly is greater than 0.5.
Let p be the true proportion of adults who prefer window seats when they fly.
The sample proportion of adults who prefer window seats is:
= 520/813 = 0.639
The standard error of the sample proportion is:
SE = sqrt((1-)/n) = sqrt(0.639(1-0.639)/813) = 0.022
The test statistic is:
z = ( - 0.5)/SE = (0.639 - 0.5)/0.022 = 6.32
Using a normal distribution, the P-value is P(Z > 6.32) < 0.0001.
Since the P-value is less than the significance level of 0.01, we reject the null hypothesis.
Therefore, we conclude that there is sufficient evidence to support the claim that the majority of adults prefer window seats when they fly.
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Question 10 > Determine whether the integral is divergent or convergent. If it is convergent, evaluate it. If not, state your answer as "DNE" 4 ( 1 -dz 22 +1 00
To determine the convergence of the integral 4(1-z)/(2^2 +1)² dz from 0 to infinity, we can use the comparison test.
First, note that (1-z) is bounded between 0 and 1, so we can compare it to the integral of 4/(2² +1)² dz from 0 to infinity, which is convergent since it is a constant times the convergent p-series with p=2.
Therefore, by the comparison test, the original integral is also convergent. To evaluate it, we can use partial fractions:
4(1-z)/(2² +1)^2 = A/(2+i)² + B/(2-i)²
Solving for A and B, we get A = (1+i)/5 and B = (1-i)/5.
Then, the integral becomes:
∫ 4(1-z)/(2² +1)² dz = A ∫ 1/(2+i)² dz + B ∫ 1/(2-i)² dz
= (1+i)/5 [-1/(2+i)] + (1-i)/5 [-1/(2-i)] from 0 to infinity
= [(1+i)(2-i) - (1-i)(2+i)]/25(2² +1)
= 0
Therefore, the integral is convergent and evaluates to 0.
To determine if an integral is convergent or divergent, you need to look at its limits and the function you are integrating. Convergent means that the integral has a finite value, while divergent means the integral does not have a finite value.
For example, if you have an integral like this:
∫(f(x) dx) from a to b,
you need to evaluate the limits 'a' and 'b' and the function 'f(x)'. If 'a' or 'b' is infinity (∞) or the function 'f(x)' behaves such that it leads to an infinite value for the integral, it is divergent. Otherwise, it is convergent.
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Which of the following Is closest to the volume of the shoebox?
How do you set up and solve?
Answer:
H
Step-by-step explanation:
You take each given side and multiply them all together
18.4 x 8.8 x 11 = approx 1782
In each figure congruent parts are marked. Give additional congruent parts to prove that the right triangles are congruent and state the congruence theorem that justifies your answer.
please help me
To prove that the right triangles are congruent, we need to show that they have three pairs of congruent parts (sides or angles).
Let's say that the given congruent parts are the hypotenuses and one leg of each triangle. To prove congruence, we can add one more pair of congruent parts, such as the other leg.
By the Side-Angle-Side (SAS) congruence theorem, if two triangles have two pairs of congruent sides and the included angle is also congruent, then the triangles are congruent. In this case, we have two pairs of congruent sides (the hypotenuses and one leg) and the included angle (the right angle) is congruent by definition.
Therefore, we can conclude that the two right triangles are congruent by SAS.
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Brody is going to invest $350 and leave it in an account for 18 years. Assuming the interest is compounded daily, what interest rate, to the
neatest tenth of a percent, would be required in order for Brody to end up with $790?
If the interest is compounded daily, the interest rate is 4.5%.
How to find the interest rate?To determine the interest rate, we can use the compound interest formula:
A = P(1 + r/n)^(nt)
Where:
A = the final amount, $790
P = the principal, $350
r = the interest rate
n = the number of times the interest is compounded per year, in this case daily (n = 365)
t = the time period in years, 18
Substituting the values :
790 = 350(1 + r/365)³⁶⁵ˣ¹⁸
790 = 350(1 + r/365)⁶⁵⁷⁰
790/350 = (1 + r/365)⁶⁵⁷⁰
ln(790/350) = 6570 * ln (1 + r/365)
Using the property of logarithms that ln(1 + x) ~ x for small values of x, we can approximate the right-hand side as:
[ln(790/350)]/6570 = r/365
r = 0.045
r = 4.5%
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90. lim (In V 4x2 + 6 - In x) = A. In 2 B. 0 C. 2 D. - 91. The horizontal asymptote(s) of the function f(x) = 37€* is (are) = = e+ A. y = 0 B. y = e C. x = 0 D. none . = 0. 109. If a, n > 0, with a > 1, then lim 2+ Inc A. True B. False
For the first question, to get the limit of the function lim (In V 4x2 + 6 - In x), we can use the property of logarithms that says ln(a) - ln(b) = ln(a/b). Applying this property to the given function, we get ln[(4x^2 + 6)/x]. Now we can simplify the expression by dividing both the numerator and the denominator by x. So we get ln(4x + 6/x), which can be rewritten as ln(4 + 6/x). Now we can take the limit as x approaches infinity. As x gets larger and larger, the 6/x term becomes smaller and smaller and approaches zero. So ln(4 + 6/x) approaches ln(4), and the final answer is A. In 2.
For the second question, to get the horizontal asymptote(s) of the function f(x) = 37€*, we can take the limit as x approaches infinity. As x gets larger and larger, the exponential term €* becomes larger and larger, approaching infinity. So the function approaches 37 times infinity, which is infinity. Therefore, there is no horizontal asymptote and the answer is D. none.
For the third question, the statement is false. The limit as x approaches infinity of 2^(ln(a)/ln(x)) is equal to infinity if a > 1 and is equal to zero if 0 < a < 1.
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pls
show work NEATLY and make sure it is correct thank you
Question 1 < > Sketch the region enclosed by y = e, y = ez, and 2 = 1. Find the area of the region. Submit Question
The region enclosed by y = e and y = ez has an intersection point at (1, e), and the area of the region is infinite.
How to find the area of a region enclosed by curves using integration?To sketch the region enclosed by y = e, y = ez, and 2 = 1, and find the area of the region, follow these steps:
1. Analyze the given equations:
- y = e (a horizontal line with a constant value e ≈ 2.718)
- y = ez (an exponential curve)
- 2 = 1 (this equation is false and does not provide any relevant information for sketching the region)
2. Since the equation 2 = 1 is irrelevant, we'll focus on the two remaining equations.
3. Find the intersection points between y = e and y = ez:
Set y = e equal to y = ez and solve for x:
e = ex
Divide both sides by e:
1 = x
4. Sketch the region:
- Plot the horizontal line y = e
- Plot the exponential curve y = ez
- Mark the intersection point (1, e)
5. Determine the area of the region:
The region enclosed by the two given equations is unbounded, meaning that it extends infinitely in both the positive and negative x-directions. As a result, the area of the region is infinite.
In summary, the region enclosed by y = e and y = ez has an intersection point at (1, e), and the area of the region is infinite.
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Round 5 6/13 to the nearest whole number.
4
5
6
7
When approximating mixed fraction 5 6/13 to the nearest whole number, the rounded value is 5.
To round the mixed fraction 5 6/13 to the nearest whole number, we examine the fractional part, which is 6/13. The general rule for rounding mixed fractions is to consider the fractional part and round up if it is greater than or equal to 1/2, and round down if it is less than 1/2.
In this case, 6/13 is approximately 0.4615. Since it is less than 1/2, we need to round down to the nearest whole number. Therefore, when rounding 5 6/13 to the nearest whole number, the answer is 5.
A mixed fraction consists of a whole number part and a fractional part. When rounding a mixed fraction, we focus on the fractional part to determine the appropriate rounding direction. If the fractional part is exactly 1/2, it is typically rounded up to the next whole number.
However, in the case of 5 6/13, the fractional part is less than 1/2, so we round down. Rounding down gives us a more accurate approximation that is closer to the original value. In this instance, rounding 5 6/13 down to 5 provides a whole number estimate that is slightly smaller but still reasonably close to the initial mixed fraction.
Rounding serves as a useful tool in situations where precise values are not necessary and a simpler approximation is sufficient for practical purposes.
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