A car factory takes 6 hours to produce 60 cars. How many hours does the factory take to produce 180 cars?

Answer:

it would be great if you provided a question here..!

Step-by-step explanation:

Answer:

Lucy reads 10 fewer pages that Carey

Step-by-step explanation:

The first sentence reads as Carey having more, so Lucy has fewer,

Rewriting it using fewer means that Lucy will be the main subject of the sentence, so Lucy reads 10 fewer pages that Carey is the sentence you want

The answer will be

x=5 or x=-5

hope this help

Answer:

Jody

Step-by-step explanation:

You can either convert 500 seconds to minutes or 8 minutes to seconds to compare. I'll do both.

There is 60 seconds in a minute. To find the total minutes of 500 seconds, divide 500 by 60 → 8.3, which means that Jody practiced for 8.3 minutes.

To find the total seconds of 8 minutes, multiply 60 seconds per minute by 8 minutes → 60 * 8 = 480 seconds which means that Bill practiced for 480 seconds.

Now you can compare. Jody practiced for 500 seconds, or 8.3 minutes. Bill practiced for 480 seconds, or 8 minutes. Jody practiced longer.

Answer:

This procedure does not result in a Binomial distribution.

Step-by-step explanation:

In a Binomial distribution there are only 2 outcomes in each trial.. In the roulette experiment there are  more than 2 possible outcomes for each trial so this condition is not met.

The spinning of an American roulette wheel 74 times doesn't result in a binomial distribution because there are more than two possible outcomes and thus the second condition - only two possible outcomes for each trial - for a binomial experiment is not met.

The procedure of spinning an American roulette wheel 74 times and recording the number the ball lands on does not result in a binomial distribution. This is because it does not meet all the conditions necessary for a statistical experiment to be classified as a binomial experiment.

For an experiment to be classified as a binomial experiment, it must meet the following conditions:

Although the procedure meets the condition of having a fixed number of trials, it fails on the second and third conditions. On a roulette wheel, there are 38 possible outcomes, not two, so it fails the condition of only having two outcomes (success or failure). Moreover, the outcome of each spin is independent but the conditions are not identical, as the chance of landing on any particular number is not the same for every spin (if we consider landing on a specific number as 'success').

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Answer: This would equal the same distance

Explanation: Think of a clock if it rotates 90 degrees counter clockwise it would stop at the number 9. If it rotates 90 clockwise it would stop at 3, then rotate that hand clockwise by 90 degrees one more time it will stop at 6, then 9 at 270 degrees.

Answer:

sorry if im late but this is the answer:

Step-by-step explanation:

Yes, I think they are the same. One revolution is 360 degrees. A 180-degree clockwise rotation is the same as a 180-degree counterclockwise rotation. The sum of the measures is 360. So, moving in a clockwise direction for 270 degrees would end at the same place as moving 90 degrees in a counterclockwise direction.

Answer:

160 cm³

Step-by-step explanation:

1. Calculate the base area of the cone

The volume for the volume (V) of a cone is

V = ⅓Ah

Data:

V = 100 cm³

h = 15 cm

Calculation:

100 = ⅓ A× 15

100 = 5A

A = 100/5 = 20 cm²

2. Volume of Pyramid.

The volume for the volume (V) of a square pyramid is  

V = ⅓Ah

Data:

A = 20 cm²

h = 24 cm

Calculation:

V = ⅓× 20× 24 = 160 cm³

The volume of the square pyramid is 160 cm³.

Answer:45000,000,000,000

Step-by-step explanation:you just have to times it

Answer:

  Because point P is not the midpoint of OQ.

Step-by-step explanation:

The circle center is found at the intersection of the perpendicular bisectors of any two chords. Segment PC is perpendicular to OQ, but does not bisect it. Hence, point C cannot be the circle center.

Answer:

When a card is chosen at random with replacement five times, X is the number of times a prime number is chosen; When a card is chosen at random with replacement six times, X is the number of times a 3 is chosen.

Step-by-step explanation:

In a binomial distribution, there are only two outcomes, or outcomes that can be reduced to 2.  In the first choice, we either draw a prime number or do not draw a prime number.  In the third choice, we either draw a 3 or do not draw a 3.

There must be a fixed number of trials.  In the first choice, we have 5 trials; in the third option, we have 6 trials.

The trials must be independent of each other.  Since the cards in the first and third options are drawn with replacement, the outcome of one trial does not influence the probability of the next trial.

The probability must be the same for every trial.  This is true of the first and third options.

Answer:

Prime And 3 is choosen

Step-by-step explanation:

Answer:

A) 90

Step-by-step explanation:

"The sum of two integers is 23" becomes

a + b = 23

"the positive difference of the same two integers is 13" becomes

a - b = 13        (difference means subtract)

Now solve the system..

a + b = 23

a - b = 13            *use addition or elimination method, since b has opposite coefficients...

2a = 36             ( we add the two equations together)

   a = 18             (divide by 2 on both sides)

Since a = 18,   18 + b = 23, gives us b = 5.     (18 + 5 = 23)

ab = (18)(5) = 90

Answer: A) 90

Let one integer is = x.

Sum of them is 23. So the other integer is (23 - x).

Given: Difference = 13.

So,

[tex]x-(23-x)=13\\ x-23+x=13\\ 2x=36\\ x=18[/tex]

So the other number is = 23 - x = 23 - 18 = 5.

So the product = 18*5=90

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Answer:

We can start solving this problem by first identifying what the elements of the sets really are.

R is composed of real numbers. This means that all numbers, whether rational or not, are included in this set.

Z is composed of integers. Integers include all negative and positive numbers as well as zero (it is essentially a set of whole numbers as well as their negated values).

W on the other hand has 0,1,2, and onward as its elements. These numbers are known as whole numbers.

W ⊂ Z: TRUE. As mentioned earlier, Z includes all whole numbers thus W is a subset of it.

R ⊂ W: FALSE. Not all real numbers are whole numbers. Whole numbers must be rational and expressed without fractions. Some real numbers do not meet this criteria.

0 ∈ Z: TRUE. Zero is indeed an integer thus it is an element of Z.

∅ ⊂ R: TRUE. A null set is a subset of R, and in fact every set in general. There are no elements in a null set thus making it automatically a subset of any non-empty set by definition (since NONE of its elements are not an element of R).

{0,1,2,...} ⊆ W: TRUE. The set on the left is exactly what is defined on the problem statement for W. (The bar below the subset symbol just means that the subset is not strict, therefore the set on the left can be equal to the set on the right. Without it, the statement would be false since a strict subset requires that the two sets should not be equal).

-2 ∈ W: FALSE. W is just composed of whole numbers and not of its negated counterparts.

Step-by-step explanation:

Certain elements and sets are examined for their relationships with the sets of real numbers, integers, and whole numbers; identifying which elements belong to which sets and if one set is a subset of another.

When comparing different sets of numbers, we analyze whether one set is a subset of another and whether certain elements belong to specific sets. The given question involves the sets R (real numbers), Z (integers), and W = {0, 1, 2, ...}, also known as the set of whole numbers or non-negative integers.

→ W ⊂ Z: This is true because all elements of W are non-negative integers, which are a subset of Z, the set of all integers including negative, zero and positive whole numbers.

→ R ⊂ W: This is false because the set of real numbers includes irrational numbers as well as negative numbers, which are not included in W.

→ 0 ∈ Z: This is true because zero is an integer and, therefore, is an element of Z.

→ ∅ ⊂ R: This is true because the empty set is a subset of all sets, including the set of real numbers.

→ {0, 1, 2, ...} ⊆ W: This is true because this set is exactly W itself, and a set is always a subset of itself.

→ -2 ∈ W: This is false because W contains only non-negative integers, and -2 is a negative number.

for a cube v=a^3, so 9^3= 729

Answer:

x-bar 64.5 is a statistic because it describes a sample.

Mu 63 is a parameter because it describes a population.

The symbol for mu is a Greek m

Step-by-step explanation:

Final answer:

A random sample mean, like the 64.5 inches height for female college students, is a statistic denoted as \( \bar{x} \), while the mean height of all adult American women is a parameter denoted as \( \mu \). Determining whether a number is a parameter or statistic informs how it is used in hypothesis testing and confidence interval construction.

Explanation:

When identifying whether the numbers are parameters or statistics, it's important to distinguish between data collected from a population or a sample. In the scenarios mentioned, such as when a random sample of female college students has a mean height of 64.5 inches, we are dealing with a statistic. This is because it is a measure obtained from a sample. The appropriate notation for this sample mean would be \( \bar{x} \). This contrasts with the information such as the mean height of all adult American women, which is a parameter because it relates to the entire population. The notation for a population mean is \( \mu \). Considering other examples provided, when we calculate a p-value or when we undertake a study and calculate the difference in mean heights between groups, we are dealing with statistics.

In practice, the difference between statistics and parameters is essential for hypothesis testing, constructing confidence intervals, and making inferences about the population based on sample data. For example, if the p-value is close to zero in a test related to the mean height of high school basketball players, it suggests that there is strong evidence against the null hypothesis \( H_0 \), which posits no effect or no difference. The alternative hypothesis \( H_1 \) would be that there is a significant difference.

Final answer:

Jason can cut 12 pieces of sausage from the 6-inch roll, since dividing the roll's length by the thickness of each piece (6 inches ÷ 1/2 inch) yields 12 pieces.

Explanation:

To determine how many pieces of sausage Jason can cut from a roll that is 6 inches long, where each piece is 1/2 inches thick, one would perform a simple division.

The length of the sausage roll (6 inches) is divided by the thickness of each piece (1/2 inch) to find out how many pieces can be cut.

This is a basic fraction division problem that we solve by multiplying the length of the roll by the reciprocal of the thickness of the pieces to be cut.

Calculation

To calculate:
6 inches × 2/1 (which is the reciprocal of 1/2) equals 12.

So, Jason can cut 12 half-inch-thick pieces from the 6-inch roll.

Answer:

B

Step-by-step explanation:

The function -x^4 + 1 is a polynomial graph. As such it has specific characteristics or behavior you can expect to see:

In conclusion, this graphs has ends which end the same direction and both face down.

Answer:

Step-by-step explanation:

The formula of regular polygon with n sides of length b and apothem a:

[tex]A=\dfrac{nba}{2}[/tex]

We have:

n = 6

b = 8

a = 6

Substitute:

[tex]A=\dfrac{(6)(8)(6)}{2}=144[/tex]

The perimeter:

[tex]P=6b\to P=(6)(8)=48[/tex]

Answer:

whichever is closest to 3.032787

Answer:

Median for sample 1 = 142

Median for sample 2 = 134

Step-by-step explanation:

For Sample 1:

For finding median, the data is first arranged into ascending or descending order. We are arranging the data in ascending order.

120, 130, 132, 136, 139, 142, 142, 144, 156, 165, 167

The formula for calculating the term which will be median is:

Median= ((n+1)/2)

Here in sample 1, n=11

So, putting n=11 in the formula

= ((11+1)/2)

= (12/2)

=6th term

The sixth term is 142, so

Median of sample 1=142

For Sample 2:

For finding median, the data is first arranged into ascending or descending order. We are arranging the data in ascending order.

112, 112, 113, 114, 125, 134, 141, 145, 146, 163, 165

The formula for calculating the term which will be median is:

Median= ((n+1)/2)

Here in sample 2, n=11

So, putting n=11 in the formula

=((11+1)/2)

=(12/2)

=6th term

The sixth term is 134, so

Median of sample 2=134

Answer:

(sin^2 w + 1) / cos w.

Step-by-step explanation:

Note: sec w = 1 / cos w and csc w = 1/ sin w.

So we have:

(sec w(1 + csc^2 w)) / (csc^2 w)​

= 1/cos w (  1 + 1/ sin^2 w)  /   (1 / sin^2 w)

= ( 1/ cos w + 1 / sin^2 w cos w) * sin^2 w

=  sin^2 w/ cos w + sin^2 w / (sin^2 w cos w)

= sin^2 w / cos w + 1 /  cos w

=  (sin^2 w + 1) / cos w.

Answer: x = 1/5

//Hope it helps.

Answer:

[tex]\log_2(\sqrt[5]{16} )=\frac{4}{5}[/tex]

Step-by-step explanation:

The given logarithmic expression is:

[tex]\log_2(\sqrt[5]{16} )[/tex]

We rewrite the radical as an exponent to obtain;

[tex]\log_2(\sqrt[5]{16} )=\log_2(16^{\frac{1}{5}} )[/tex]

Recall and use the power rule; [tex]\log_a(M^n)=n\log_a(M)[/tex]

[tex]\log_2(\sqrt[5]{16} )=\frac{1}{5}\log_2(16 )[/tex]

We write 16 as an index number to base 2.

[tex]\log_2(\sqrt[5]{16} )=\frac{1}{5}\log_2(2^4)[/tex]

We apply the power rule again;

[tex]\log_2(\sqrt[5]{16} )=\frac{4}{5}\log_2(2)[/tex]

We simplify to get;

[tex]\log_2(\sqrt[5]{16} )=\frac{4}{5}(1)[/tex]

[tex]\log_2(\sqrt[5]{16} )=\frac{4}{5}[/tex]

ANSWER

The correct answer is A.

EXPLANATION

The given expression is

[tex]( \frac{ {p}^{12} {q}^{ \frac{3}{2} } }{64} ) ^{ \frac{5}{6} } [/tex]

Recall that:

[tex] {a}^{ \frac{m}{n} } = (\sqrt[n]{a} ) ^{m} [/tex]

For the given expression,

[tex]m = 5[/tex]

[tex]n = 6[/tex]

and

[tex]a = \frac{ {p}^{12} {q}^{ \frac{3}{2} } }{64} [/tex]

We substitute all these values to obtain the radical form:

[tex]( \frac{ {p}^{12} {q}^{ \frac{3}{2} } }{64} ) ^{ \frac{5}{6} } = ( \sqrt[6]{( \frac{ {p}^{12} {q}^{ \frac{3}{2} } }{64} ) })^{5} [/tex]

The correct choice is A.

Answer:

  θ = 6.28k +3.14

Step-by-step explanation:

cos(θ) is -1 for θ = π and multiples of 2π added to that.

___

The answer above rounds π and 2π as requested by the problem statement. Those values are only valid for small values of k. (I suppose it might be reasonable to argue that no rounding is appropriate.)

Answer:

Selena lives 1/3 of a mile away from her school.

Step-by-step explanation: If the walk to her school AND back is 2/3 of a mile, then all you have to do is split 2/3 in half. Which is 1/3 of a mile.

Answer:

1/3 miles. 2/3 divided by 2 = 1/3.

Step-by-step explanation:

Answer:

C) 0.70

Explanation:

:))

Answer:

C

Step-by-step explanation:

You're probably stuck by this problem. Let's rewrite the problem.

The first part of simplifying the expression is to simply the radicals. Since 45 has a factor which is a square, let's simplify.

15 - 25% = 14.47 ounces of shampoo

The original shampoo bottle held 12 ounces before the 25% increase to 15 ounces. For the tile cleanser, the percent by mass of HCl is calculated to be 14.84%. Discussions of consumer product concentrations, like laundry detergent costs per ounce, often involve linear relationships and predictive models.

The question requires understanding percent increase and how to calculate the original amount given the increased quantity. To find the original volume of the shampoo bottle before the 25% increase, we set up the equation where the original volume (V) times 1.25 (to represent the 25% increase) equals the new volume of 15 ounces:

V x 1.25 = 15 ounces

To solve for V, we divide both sides of the equation by 1.25:

V = 15 ounces / 1.25

V = 12 ounces

Therefore, the old bottle held 12 ounces of shampoo.

To address another concept related to consumer products, the question on mass percentage, namely the percent by mass of HCl in a tile cleanser, also represents a common mathematical calculation in consumer product information. The calculation is as follows:

Percent by mass = (mass of solute / total mass of solution) x 100%

Percent by mass of HCl = (135 g / (135 g + 775 g)) x 100%

Percent by mass of HCl = (135 g / 910 g) x 100%

Percent by mass of HCl = 14.84%

Thus, the bottle of tile cleanser has 14.84% by mass of HCl.

When discussing the cost per ounce of laundry detergent in different sizes, such as a 40 oz. size or a 90 oz. size, the concept of linear relationships may be explored, as well as the possibility of identifying outliers or considering the validity of predictive models like the least-squares line.

Answer:

€83.60 = £62.70

Step-by-step explanation:

£3/€4 = £x/€ 83.60

¾ = x/83.60

Multiply each side by the lowest common denominator (4 × 83.60)

3 × 83.60 = 4x

Divide each side by 4

x = (3 × 83.60)/4 = £62.70

∴ €83.60 = £62.70

(The conversion factor is out of date. The current conversion factor is closer to £6 = €7.)

Using the given exchange rate, we set up a conversion equation and solve for the unknown variable. We find that €83.60 is roughly equivalent to 62.86 pounds.

Based on the given exchange rate, 1 pound (£) is equivalent to 1.33 Euros (€). Therefore, to convert €83.60 to pounds, we should do the following:

Therefore, €83.60 is approximately equivalent to 62.86 pounds.

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Answer:

36 cups

Step-by-step explanation:

If you notice, 6 times 9 is 54. So, 4 times 9 is 36. You need 36 cups of strawberries!

Answer:

x=3

Step-by-step explanation:

[tex]2x+3+5x=24\\7x+3=24\\7x=21\\x=3[/tex]