If there is a one-to-one correspondence between two sets, we say that the sets have the same "size" or the same "cardinality."
Cardinality is a term used in mathematics and set theory to describe the size or number of elements in a set. It refers to the property of a set that determines how many objects it contains. For example, the cardinality of the set {1, 2, 3} is 3, because it contains three elements. The cardinality of a set can be finite (if it has a specific number of elements) or infinite (if it contains an uncountable number of elements).
Cardinality is usually denoted using the vertical bar notation |A|, where A is the set in question. For example, if A = {a, b, c}, then |A| = 3.
Cardinality is an important concept in mathematics, especially in areas such as set theory, combinatorics, and number theory. It is used to compare the sizes of different sets and to determine the properties of operations that involve sets, such as union, intersection, and complement.
If there is a one-to-one correspondence between two sets, we say that the sets have the same "size" or the same "cardinality."
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Twenty-four pairs of adult brothers and sisters were sampled at random from a population. The difference in heights, recorded in inches (brother’s height minus sister’s height), was calculated for each pair. The 95% confidence interval for the mean difference in heights for all brother-and-sister pairs in this population was (–0. 76, 4. 34). What was the sample mean difference from these 24 pairs of siblings?
–0. 76 inches
0 inches
1. 79 inches
4. 34 inches
The sample mean difference in heights for these 24 pairs of siblings is 1.79 inches. So the third option is correct.
The 95% confidence interval for the mean difference in heights for all brother-and-sister pairs in the population was (–0.76, 4.34).
This means that if we were to repeat this sampling process many times, we would expect 95% of the resulting confidence intervals to contain the true mean difference in heights for all brother-and-sister pairs in the population.
To find the sample mean difference from these 24 pairs of siblings, we take the midpoint of the confidence interval. The midpoint is the average of the lower and upper bounds, which is:
(-0.76 + 4.34) / 2 = 1.79
Therefore, the sample mean difference in heights for these 24 pairs of siblings is 1.79 inches.
So the correct answer is third option.
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The value of a professional basketball player's autograph rose 40% in the last year. It is now worth $350.00. What was it worth a year ago? A. $260.00 B. $250.00 C. $270.00 D. $230.00
Answer: B
Step-by-step explanation: 250 x 140% = 350
About 20 years ago, a mathematician noted that his dog, when retrieving a
frisbee in a lake, would run parallel to the shore for quite some distance, and then jump into the water and
swim straight for the frisbee. She would not enter the lake immediately, nor would she wait until she was on
the point on the shore closest to the frisbee. Pennings theorized that the dog entered the water at the point
that would minimize the total length of time it takes to reach the frisbee. Suppose that the dog runs at 13
mph along the shore of the lake but swims at only 4. 3 mph in the water. Further, suppose that the frisbee is
in the water 60 feet off shore and 220 feet down the shoreline from the dog. Suppose that the dog enters the
water after running x feet down the shoreline and then enters the water. Compute the total length of time, T,
it will take for the dog to reach the frisbee. Next, determine a natural closed interval that limits reasonable
values of x. Finally, find the value of x that will minimize the time, T, that it takes for the dog to retrieve the
frisbee
a. The total length of time, T, it will take for the dog to reach the frisbee is 143.22
b. A natural closed interval that limits reasonable values of x is [0, 220] is a reasonable closed interval for x.
c. The value of x that will minimize the time, T, that it takes for the dog to retrieve the frisbee is 143.22
Let's start by breaking down the problem into two parts: the time it takes for the dog to run along the shore, and the time it takes for the dog to swim in the water. Let's call the distance the dog runs along the shore "d1" and the distance the dog swims in the water "d2".
To find d1, we can use the Pythagorean theorem:
d1 = sqrt(x^2 + 60^2)
To find d2, we can use the fact that the total distance the dog travels is equal to 220 feet:
d2 = 220 - x
Now we can use the formulas for distance, rate, and time to find the total time it takes for the dog to retrieve the frisbee:
T = d1/13 + d2/4.3
Substituting our expressions for d1 and d2, we get:
T = [sqrt(x^2 + 3600)]/13 + (220 - x)/4.3
To find the value of x that minimizes T, we can take the derivative of T with respect to x, set it equal to zero, and solve for x:
dT/dx = x/13sqrt(x^2 + 3600) - 1/4.3 = 0
Multiplying both sides by 13sqrt(x^2 + 3600), we get:
x = (13/4.3)sqrt(x^2 + 3600)
Squaring both sides and solving for x, we get:
x ≈ 143.22
So the dog should enter the water after running about 143.22 feet down the shoreline to minimize the total time it takes to retrieve the frisbee.
To check that this is a minimum, we can take the second derivative of T with respect to x:
d^2T/dx^2 = (13x^2 - 46800)/(169(x^2 + 3600)^(3/2))
Since x^2 and 3600 are both positive, the numerator is positive when x is not equal to zero, and the denominator is always positive. Therefore, d^2T/dx^2 is always positive, which means that x = 143.22 is indeed the value that minimizes T.
As for the natural closed interval that limits reasonable values of x, we know that x has to be greater than zero (since the dog needs to run at least some distance along the shoreline before entering the water), and it has to be less than or equal to 220 (since the frisbee is 220 feet down the shoreline from the dog). So the interval [0, 220] is a reasonable closed interval for x.
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Events D and E are independent, with P(D) = 0.6 and P(D and E) = 0.18. Which of the following is true?
(A) P(E) = 0.12
(B) P(E) = 0.4
(C) P(D or E) = 0.28
(D) P(D or E) = 0.72
(E) P(D or E) = 0.9
The probability that is true is P(D or E) = 0.72.
Option D is the correct answer.
We have,
We can start by using the formula:
P(D and E) = P(D) x P(E)
Since D and E are independent events, their probabilities multiply to give the probability of both events happening together.
Plugging in the given values.
0.18 = 0.6 x P(E)
Solving for P(E).
P(E) = 0.18 / 0.6 = 0.3
So option (A) is not correct.
To find P(D or E), we can use the formula:
P(D or E) = P(D) + P(E) - P(D and E)
Plugging in the given values.
P(D or E) = 0.6 + 0.3 - 0.18 = 0.72
Thus,
P(D or E) = 0.72 is true.
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A cylindrical shark tank with a height of 3 meters and a diameter of 15 meters holds 3 sharks. What is the
population density of the shark tank? (round answer to 4 decimal places)
The population density of the fish is 0.0061sharks/m²
What is population density?Population density is a measurement of population per unit land area. Therefore the population density can be expressed as;
population density = population/ area
The number of fish in the tank is 3
The area of the tank is given as!
A = 2πr( r+h)
h = 3meters
r = d/2 = 15/2 = 7.5
A = 2 × 3.14 × 7.5(7.5+3)
A = 47.1( 10.5)
A = 494.55 m²
Therefore population density = 3/494.55
= 0.0061sharks/m²
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Solve for x.
2x²8x+5=0
Enter your answers in the boxes.
x = |or x =
T
We can solve the quadratic equation 2x² - 8x + 5 = 0 by using the quadratic formula, which states that for an equation of the form ax² + bx + c = 0, the solutions are given by:
x = (-b ± sqrt(b² - 4ac)) / 2a
In this case, a = 2, b = -8, and c = 5. Substituting these values into the formula, we get:
x = (-(-8) ± sqrt((-8)² - 4(2)(5))) / (2(2))
x = (8 ± sqrt(64 - 40)) / 4
x = (8 ± sqrt(24)) / 4
x = (8 ± 2sqrt(6)) / 4
Simplifying the expression by factoring out a common factor of 2 in the numerator and denominator, we get:
x = (2(4 ± sqrt(6))) / (2(2))
x = 4 ± sqrt(6)
Therefore, the solutions to the equation 2x² - 8x + 5 = 0 are:
x = 4 + sqrt(6) or x = 4 - sqrt(6)
An egg is dropped from the roof of a building. The distance it falls varies directly with the square of the time it falls. It takes 1/2 second for the egg to fall eight feet, how long will it take the egg to fall 200 feet?
What does K equal? And how many seconds?
Answer:
16 seconds
Step-by-step explanation:
Find the value of c step by step
PLEASE HELP
Answer:
c = 12
Step-by-step explanation:
[tex] {5}^{2} + {c}^{2} = {13}^{2} [/tex]
[tex]25 + {c}^{2} = 169[/tex]
[tex] {c}^{2} = 144[/tex]
[tex]c = 12[/tex]
Teen Cigarette Use Is Down The US Centers for Disease Control conducts the National Youth Tobacco Survey each year. The preliminary results1 of 2019 show that e-cigarette use is up among US teens while cigarette use is down. We examined e-cigarette use in Exercise 3. 137 and here we estimate cigarette use. In the sample of 1582 teens, 92 reported smoking a cigarette in the last 30 days
he estimated proportion of teens who smoked cigarettes in the last 30 days is 0.05815 or 5.815%. This result suggests that cigarette use among teens is down, as stated in the National Youth Tobacco Survey conducted by the US Centers for Disease Control.
It is mentioned that the 2019 preliminary results show that e-cigarette use is up among US teens while cigarette use is down. In the sample of 1582 teens, 92 reported smoking a cigarette in the last 30 days.
To estimate the proportion of teens who smoked cigarettes in the last 30 days, follow these steps:
Step 1: Find the total number of teens in the sample.
There were 1582 teens in the sample.
Step 2: Find the number of teens who reported smoking a cigarette in the last 30 days.
92 teens reported smoking a cigarette in the last 30 days.
Step 3: Calculate the proportion of teens who smoked cigarettes in the last 30 days.
Divide the number of teens who smoked cigarettes (92) by the total number of teens in the sample (1582).
Proportion = 92 / 1582 = 0.05815 (rounded to 5 decimal places)
So, the estimated proportion of teens who smoked cigarettes in the last 30 days is 0.05815 or 5.815%. This result suggests that cigarette use among teens is down, as stated in the National Youth Tobacco Survey conducted by the US Centers for Disease Control.
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The life of Sunshine CD players is normally distributed with a mean of 4. 1 years and a standard deviation of 1. 3 years. A CD player is guaranteed for 3 years. We are interested in the length of time a CD player lasts. Find the probability that a CD player will break down during the guarantee period. Sketch the situation. Label and scale the axes. Shade the region corresponding to the probability
The probability that a CD player will break down during the guarantee period is about 0.1985 or 19.85%.
To find the probability that a Sunshine CD player will break down during the 3-year guarantee period, we'll use the properties of the normal distribution.
Given a mean life of 4.1 years and a standard deviation of 1.3 years, we can calculate the z-score corresponding to the 3-year guarantee period:
z = (x - μ) / σ = (3 - 4.1) / 1.3 ≈ -0.846
Now, we'll look up the probability associated with this z-score in a standard normal distribution table, or use a calculator or software to find the cumulative probability. The probability corresponding to a z-score of -0.846 is approximately 0.1985.
Therefore, the probability that a CD player will break down during the guarantee period is about 0.1985 or 19.85%.
For the sketch, draw a bell-shaped curve to represent the normal distribution. Mark the x-axis with the mean (4.1 years) in the center, and scale it with the standard deviation (1.3 years).
Place a vertical line at 3 years to represent the end of the guarantee period, and shade the area to the left of this line to represent the probability of breaking down during that period.
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what are the ordered pairs of y>1/2x+3
The ordered pairs of the inequality expression is (0, 4)
What are the ordered pairs of the inequality expressionFrom the question, we have the following parameters that can be used in our computation:
The inequality expression y>1/2x+3
To determine the ordered pairs of the inequality expression, we set x - 0 and then calculate the value of y
Using the above as a guide, we have the following:
y > 1/2 * 0 + 3
Evauate
y > 3
This means that the value of y is greater than 3 say y = 4
So, we have (0, 4)
Hence, the ordered pairs of the inequality expression is (0, 4)
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Mai created a scale model of a shoe store her company plans to build. the ratio of the model's dimensions to the dimensions of the actual shoe store to
be built is 1:20. if the volume of the model was 35ft 3, what is the volume of the actual shoe store that mai's company plans to build?
The volume of the actual shoe store that Mai's company plans to build is 280,000 ft³.
Based on the given information, Mai created a scale model with a ratio of 1:20. If the volume of the model is 35 ft³, we can find the volume of the actual shoe store by using the ratio.
Since the ratio of the dimensions is 1:20, the ratio of the volumes will be (1:20)³, which is 1:8000. Therefore, to find the volume of the actual shoe store, we can multiply the volume of the model by 8000:
Volume of the actual shoe store = 35 ft³ × 8000 = 280,000 ft³
So, the volume of the actual shoe store that Mai's company plans to build is 280,000 ft³.
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The length of a rectangle is 4/3 its width and it's area is 8 1/3 square meters. What are it's dimensions?. Write your answers as mixed numbers
The dimensions of the given rectangle is 2 1/2 meters (width) and 3 1/3 meters (length).
First, let's define the variables for the rectangle: let the width be w meters, and the length be (4/3)w meters since the length is 4/3 times the width. The area of a rectangle is calculated by multiplying its length and width. In this case, the given area is 8 1/3 square meters.
Now, we can write an equation using the area and dimensions:
Area = Length × Width
8 1/3 = (4/3)w × w
First, convert the mixed number 8 1/3 to an improper fraction, which is 25/3. Then, we can solve for w:
25/3 = (4/3)w²
To find w², multiply both sides by 3/4:
w² = (25/3) × (3/4)
w² = 25/4
Now, take the square root of both sides:
w = √(25/4)
w = 5/2
So, the width is 5/2 meters, or 2 1/2 meters. To find the length, multiply the width by 4/3:
Length = (4/3)(5/2) = 20/6 = 10/3
The length is 10/3 meters, or 3 1/3 meters. Therefore, the dimensions of the rectangle are 2 1/2 meters (width) and 3 1/3 meters (length).
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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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Use a calculator to find the values of the inverse trigonometric functions. Round to the nearest degree.
The values of the inverse trigonometric functions are 72°, 76° and 85°.
How to explain the stepsThe range of the inverse trigonometric function is limited to a certain interval based on the domain of the original trigonometric function.
Its also important to identify the trigonometric ratio that corresponds to the given value.
The value on degree for inverse of sin (2/3) will be 41.81° which is 42°. Also, inverse of tan(4) is 76° using the calculator.
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Use a calculator to find the values of the inverse trigonometric functions. Round to the nearest degree.
inverse of sin (2/3)
inverse of tan(4)
inverse of tan (0.1)
These ranges are called continuous ranges. Explain why these ranges are expressed in inequality notation.
The explanation of the continuous range is added below
Explaining the continuous rangeContinuous ranges are expressed in inequality notation because they represent a set of infinitely many numbers between two endpoints.
Inequality notation allows us to describe this range using mathematical symbols to show that the values can be any number between the two endpoints, including the endpoints themselves.
For example, a continuous range might be described as "all real numbers between 0 and 1, including 0 and 1".
This can be expressed in inequality notation as 0 ≤ x ≤ 1, where x is a real number.
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We want to conduct a hypothesis test of the claim that the population mean time it takes drivers to react following the application of brakes by the driver in front of them is more than 2. 5 seconds. So, we choose a random sample of reaction time measurements. The sample has a mean of 2. 4 seconds and a standard deviation of 0. 5 seconds. For each of the following sampling scenarios, choose an appropriate test statistic for our hypothesis test on the population mean. Then calculate that statistic. Round your answers to two decimal places. (a) The sample has size 110, and it is from a non-normally distributed population with a known standard deviation of. It is unclear which test statistic to use. (b) The sample has size 12,and it is from a normally distributed population with an unknown standard deviation. Z=
t=
It is unclear which test statistic to use.
(a) We will use the "t" as test-statistics and the value of "t" is t = -0.87.
(b) We will use "z" as the test-statistics and the value of "z" is z = -0.77.
In statistics, a test statistic is a numerical summary of a sample that is used to make an inference about a population parameter. It is calculated from the sample data and is used to test a hypothesis or to make a decision about some characteristic of the population.
Part (a) : In this case, we do not know the "standard-deviation",
the case in which standard-deviation is un-known, "t" is used as a "test-statistics.
The Standard-error-of-mean (SE) is = s/√n = 0.5/√19 = 0.1148.
So, "t" = (mean - 2.5)/SE,
Substituting the values,
We get,
t = (2.4 - 2.5)/0.1148 = -0.87.
Part (b) : In this case, we know the "standard-deviation",
The case in which standard-deviation is known, "z" is used as a "test-statistics.
The Standard-error-of-mean (SE) is = s/√n = 0.45/√12 = 0.1299.
So, "z" = (mean - 2.5)/SE,
Substituting the values,
We get,
z = (2.4 - 2.5)/0.1299 = -0.77.
Therefore, the value of "z" is -0.77.
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The given question is incomplete, the complete question is
We want to conduct a hypothesis test of the claim that the population mean time it takes drivers to react following the application of brakes by the driver in front of them is more than 2.5 seconds. So, we choose a random sample of reaction time measurements. The sample has a mean of 2.4 seconds and a standard deviation of 0.5 seconds.
For each of the following sampling scenarios, choose an appropriate test statistic for our hypothesis test on the population mean. Then calculate that statistic. Round your answers to two decimal places.
(a) The sample has size 19, and it is from a non-normally distributed population with an unknown standard deviation.
Which test-statistic will you use z, t or It is unclear which test statistic to use.
(b) The sample has size 12,and it is from a normally distributed population with an known standard deviation of 0.45.
Which test-statistic will you use z, t or It is unclear which test statistic to use.
I need help on this part, I don't even get it, please help me on this part.
Here what it said:
"A store offers 3 brands of tee-shirts in 6 colors each in either long sleeve or short. How many different shirts are there?"
Answer:
36!
Step-by-step explanation:
There is 3 brands of clothing each brand has short and long sleeve, and both come in 6 different colors.
multiply 6*2 (because 6 different colors per long and short sleeve) get 12, then you multiply 12 times 3 because each one is from a different brand.
IT MAY BE A BI CONFUSING I SUCK AT EXPLAINING BUT
YEAHHH!
Answer:
18shirts
Step-by-step explanation:
3×6=18 shirts
solve this trigonometric equation cos²x =3sin²x
Answer:
Step-by-step explanation:
cos²x =3sin²x subtract both sides by 3sin²x
cos²x - 3sin²x = 0 use identity cos²x+sin²x=1 => cos²x = 1-sin²x
substitute in
(1-sin²x)-3sin²x = 0 combine like terms
1-4sin²x=0 factor using difference of squares rule
(1-2sin x)(1+2sin x)=0 set each equal to 0
(1-2sin x)=0 (1+2sin x)=0
-2sinx = -1 2sinx= -1
sinx=1/2 sinx =-1/2
Think of the unit circle. When is sin x = ±1/2
at [tex]\pi /6, 5\pi /6, 7\pi /6, 11\pi /6[/tex]
This is from 0<x<2[tex]\pi[/tex]
Emmanuel weighs 150 pounds and he has normal liver function. It will take him approximately ________ hours to metabolize one standard drink
Emmanuel weighs 150 pounds and he has normal liver function. It will take him approximately 1 hour to metabolize one standard drink. Metabolism of alcohol is primarily done in the liver where it is broken down into acetaldehyde, which is then further broken down into water and carbon dioxide.
The liver can only metabolize a certain amount of alcohol per hour, which is why it takes time for the body to process and eliminate alcohol. However, other factors such as age, gender, body composition, and food consumption can also affect how quickly alcohol is metabolized.
It is important to drink responsibly and be aware of how alcohol can affect your body.
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How do the absolute values of -8 1/2 and -9 1/2 compare? Choose a symbol
to make the statement true.
The absolute value of -8 1/2 is less than the absolute value of -9 1/2.
To compare the absolute values of -8 1/2 and -9 1/2, follow these steps:
1. Convert the mixed numbers to improper fractions:
-8 1/2 = -17/2
-9 1/2 = -19/2
2. Find the absolute values of both numbers:
|-17/2| = 17/2
|-19/2| = 19/2
3. Compare the absolute values and choose the correct symbol:
17/2 < 19/2
So, the statement is: The absolute value of -8 1/2 is less than the absolute value of -9 1/2.
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Suppose that uranus rotates on its axis once every 17.2 hours. the equator lies on a circle with a radius of 15,881 miles. (a) find the angular speed of a point on its equator in radians per day (24 hours). (b) find the linear speed of a point on the equator in miles per day. do not round any intermediate computations, and round your answer to the nearest whole number. (a) angular speed: radians per day (b) linear speed : miles per day
Uranus rotates on its axis at an angular speed of 0.355 radians per day, and a point on its equator travels at a linear speed of approximately 9,522 miles per day.
What is the angular and linear speed of a point on Uranus' equator?
Uranus is one of the gas giants in our solar system, and it has a unique orientation compared to the other planets. Its axis of rotation is tilted at an angle of 97.77 degrees relative to its orbit around the Sun, which means that it essentially spins on its side. This also means that its equator is located in a plane perpendicular to its orbit, unlike Earth's equator, which is in the plane of its orbit.
Given that Uranus rotates on its axis once every 17.2 hours and its equator lies on a circle with a radius of 15,881 miles, we can calculate the angular and linear speed of a point on its equator.
Angular speed is a measure of the rate of change of an angle with respect to time. In this case, we want to know the angular speed of a point on Uranus' equator in radians per day. To find this, we can start by calculating the angle that a point on the equator travels in one day, which is equal to the angular speed times the time, or 2π radians (a full circle).
So, the angular speed of a point on Uranus' equator is:
(2π radians)/(24 hours) = 0.2618 radians per hour
To convert this to radians per day, we multiply by the number of hours in a day:
0.2618 radians/hour × 24 hours/day = 0.355 radians per day
Therefore, a point on Uranus' equator travels at an angular speed of 0.355 radians per day.
Linear speed is a measure of the rate of change of position with respect to time. In this case, we want to know the linear speed of a point on Uranus' equator in miles per day. To find this, we can use the formula:
Linear speed = angular speed × radius
Where the radius is the distance from the center of Uranus to a point on its equator, which we are given as 15,881 miles.
So, the linear speed of a point on Uranus' equator is:
0.355 radians/day × 15,881 miles = 9,521.9 miles per day
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The product of 58 and the quantity 8b plus 8.
Expression[tex]58(8b+8)[/tex]simplifies to[tex]464b+464.[/tex]
How to simplify quantity expressions?
Calculate the product of 58 and the quantity 8b + 8
The given expression is:
[tex]58(8b + 8)[/tex]
Multiplying 58 by 8b and 8, we get:
[tex]464b + 464[/tex]
Therefore, the answer is:
[tex]58(8b + 8) = 464b + 464[/tex]
To find the product of 58 and the quantity 8b + 8, we need to use the distributive property of multiplication over addition, which states that the product of a number and a sum is equal to the sum of the products of the number and each term in the sum. In this case, we can distribute 58 over 8b and 8, as follows:
[tex]58(8b + 8) = 58 × 8b + 58 × 8[/tex]
Multiplying 58 by 8b and 8 separately, we get:
[tex]58 × 8b = 464b[/tex]
[tex]58 × 8 = 464[/tex]
Adding the products, we get the final answer:
[tex]58(8b + 8) = 464b + 464[/tex]
Therefore, the expression [tex]58(8b + 8)[/tex]simplifies to[tex]464b + 464.[/tex]
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The height of Mount Rushmore is 5900 feet. What is the height of Mount Rushmore in
centimeters? (1 in = 2. 54 cm)
Answer:
the answer is 14,986 centimetres
a) Calculate the scale factor from shape A to shape B.
b) Find the value of t.
Give each answer as an integer or as a fraction in its simplest form.
A
5 cm
15 cm
7cm
B
12 cm
4cm
t cm
a). The scale factor of shape A to B is 4/5
b) The value of t is 5.6cm
What is scale factor?The scale factor is a measure for similar figures, who look the same but have different scales or measures.
Scale factor = dimension of new length/ dimension of old length
= 4/5 = 12/15
therefore the scale factor of from shape A to shape B is 4/5.
b) 4/5 = t/7
5t = 28
divide both sides by 5
t = 28/5
t = 5.6 cm
therefore the value of t is 5.6cm
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The image shows three sets of stuffed bears. Each set represents a term of the sequence (1, 4, 7,. . . ). An arrangement of stuffed toy bears in groups of 1, 4, and 7
What is the next term in the sequence?
Describe the domain of the sequence. Describe the range of the sequence
The next term in the sequence of the series which have groups of 1, 4, and 7 is 10.
The fundamental concepts in mathematics are series and sequence. A series is the total of all components, but a sequence is an ordered group of items in which repeats of any kind are permitted. One of the typical examples of a series or a sequence is a mathematical progression.
We have the series as 1, 4, 7, ....
First term = a = 1
Common difference = d = 3
Using the formula for the Term is
T = a + (n-1)d
T = 1 + (n-1)3
= 1 + 3n - 3
T = 3n - 2
To find the next term in the series we need to find the 4th term so
T₄ = 3(4) - 2
= 12 - 2
T₄ = 10.
The domain of the sequence T = 3n - 2 is all Real numbers n ∈ Real numbers.
The range is given as
R ∈ (-∞, ∞).
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Answer:
1, 4, and 7 is 10
Step-by-step explanation:
The pattern sequence follows the add 3 rule so, the next term in the sequence will be 10.
The index of the terms of represents the domain of a function, which is { 1, 2, 3, . . .}.
The range includes the terms of the sequence {1, 4, 7, . . .}.
You spin a spinner that has 12 equal-sized sections numbered 1 to 12. Find the probability of p(odd or multiple of 5)
The probability we want to get is:
p(odd or multiple of 5) = 7/12
How to find the probability?The probability is equal to the quotient between the number of outcomes for the given event and the total number of outcomes.
The numbers that are odd or multiples of 5 in the set of outcomes are:
{1, 3, 5, 7, 9, 10, 11}
So 7 outcomes out of 12, then the probability is:
P = 7/12
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How many possible outcomes are in the sample space if the spinner shown is spun twice?
There are 225 possible outcomes in the sample space if the spinner is spun twice
How many possible outcomes are in the sample spaceFrom the question, we have the following parameters that can be used in our computation:
Spinner
The number of sections in the spinner is
n = 15
If the spinner shown is spun twice, then we have
Outcomes = n²
Substitute the known values in the above equation, so, we have the following representation
Outcomes = 15²
Evaluate
Outcomes = 225
Hence, the possible outcomes are in the sample space are 225
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A cylinder has the net shown.
What is the surface area of the cylinder in terms of π?
40.28π in2
22.80π in2
18.62π in2
15.01π in2
Step-by-step explanation:
Each circle has area pi r^2 = (pi)( 1.9)^2 in ( 1.9 is the RADIUS)
there are two of them so total circle area = 2 pi (1.9)^2 in^2
Then there is the rectangle
one of its dimensions is the CIRCUMFERENCE of the circles
= pi * d = pi * 3.8 in
and the other dimension is 3
area of rectangle = pi * 3.8 * 3 in^2
Add all of the areas for the total area 2 pi (1.9)^2 + pi * 3.8*3 in^2 =
= 18.62 pi in^2
Describe and correct the error a student made in finding the domain for the quotient when f(x) = 2x² - 3x + 1 and g(x) = 2x - 1.
So the domain is all real numbers.