Sara used 3/4 pound of blueberries to make 1/2 cup of jam how many pounds of blueberries would she need to. make a cup of jam

Answer:

you can make 12 bouquets...each containing 5 roses, 7 daisies, and 2 lilies

Step-by-step explanation:

Answer:

61.4%

Step-by-step explanation:

There are a total of 43+27 = 70 students that like sandwiches.

Out of these, 43 also like tacos; this is

43/70 = 0.614 = 61.4%

Answer:

The probability is 42%

Step-by-step explanation:

The probability that A and B, two independent events, happens is given by:

P=P(A)*P(B)

In this case, lets call A the event in which there are sunny weather tomorrow and B the event in which Tara goes to the beach. Taking into account that they are independent, that means that one event doesn't affect the other, the probability P that it will be sunny tomorrow and Tara will go to the beach is:

P=0.7*0.6=0.42

Multiplying P by 100, we get:

P=42%

So, the probability that it will be sunny tomorrow and Tara will go to the beach is 42%

Let us say that,

X = the number of residents in the sample who favor annexation.
X has a distribution which follows a binomial curve with parameters:

 n=50 and p=0.29

Calculating for mean:
Mean of X = n * p = 50 * 0.29

Mean of X = 14.5

Calculating for standard deviation:
Standard deviation of X = sqrt(n * p * (1 - p))

Standard deviation of X = 3.2086

Now we are to find the probability that at least 35% favour annexation:
35% * 50 = 17.5 residents

Normal approximation can be applied in this case since sample size is greater than 31. Therefore,

 Required Probability:

P(X>=17.5) = 1 - P(X<17.5)

1 - P(z<(17.5-14.5)/3.2086) = 1 - P(z<0.9350) = 1- 0.825106 = 0.174894

Answer:

0.175 or 17.5%

The probability that at least 35% of a sample of 50 residents favor annexation is approximately 0.1469.

To solve this problem, we are dealing with a situation where we need to find the probability that at least 35% of a random sample of 50 residents favor annexation, given that the true population proportion is 29%.

Let's denote:

- ( p = 0.29 ) as the population proportion favoring annexation.

- ( n = 50 ) as the sample size.

We are interested in finding [tex]\( P(X \geq 0.35 \times 50) \),[/tex] where ( X ) follows a binomial distribution[tex]\( X \sim \text{Binomial}(n=50, p=0.29) \).[/tex]

First, calculate [tex]\( 0.35 \times 50 \):[/tex]

[tex]\[ 0.35 \times 50 = 17.5 \][/tex]

Since we can't have half a person favoring annexation, we take the ceiling of 17.5, which is 18. So, we need to find [tex]\( P(X \geq 18) \).[/tex]

To find this probability, we can use the cumulative distribution function (CDF) of the binomial distribution or an appropriate normal approximation. Here, due to large ( n ) and ( p), we can use the normal approximation to the binomial distribution.

1. **Calculate mean and standard deviation for normal approximation:**

  - Mean (( mu )) of the binomial distribution: ( mu = np = 50 x 0.29 = 14.5 )

  - Standard deviation[tex](\( \sigma \)) of the binomial distribution: \( \sigma = \sqrt{np(1-p)} = \sqrt{50 \times 0.29 \times 0.71} \approx 3.34 \)[/tex]

2. **Approximate using normal distribution:**

  Convert [tex]\( X \geq 18 \)[/tex]  to the corresponding normal distribution:

[tex]\[ Z = \frac{18 - 14.5}{3.34} \approx 1.05 \][/tex]

3. **Find the probability using the standard normal distribution:**

[tex]\[ P(X \geq 18) \approx P\left(Z \geq \frac{18 - 14.5}{3.34}\right) = P(Z \geq 1.05) \][/tex]

  Using standard normal distribution table or calculator,

[tex]\[ P(Z \geq 1.05) \approx 0.1469 \][/tex]

Therefore, the probability that in a random sample of 50 residents at least 35% will favor annexation is approximately [tex]\( \boxed{0.1469} \).[/tex]

Answer:

standard form y = -x + b.

Step-by-step explanation:

Given : Graph and points (0,4)(4,0).

To find : Standard form of equation .

Solution : We have given that  points (0,4)(4,0).

Let [tex]x_{1}[/tex] = 0 ,   [tex]x_{2}[/tex] = 4

[tex]y_{1}[/tex] =4  ,      [tex]y_{2}[/tex] = 0.

Slope = [tex]\frac{y_{2}-y_{1}  }{x_{2}-x_{1}  }[/tex].

Plugging values

Slope = [tex]\frac{0 - 4}{4 - 0}[/tex].

Slope = -1 .

Standard form y = m x + b

                        y = -1 x + b.

Plug (0,4)  

 4 = -1 ( 0)+ b

4 = b .

Now , plugging values b= 4 , m = -1.

y = -x + b.

Therefore, standard form y = -x + b.

Answer:  The correct option is

[tex](A)~~x+y=90,~~x-y=8.[/tex]

Step-by-step explanation:  Given that one of the two complementary angles is 8 degrees less than the other.

We are to select the correct system of equations represents the given word problem.

Let x and y represents the two complementary angles where y is less than x.

Since one angle is 8 degrees less than the other and y is less than x, so we have

[tex]x-y=8.[/tex]

We know that the sum of two complementary angles is 90 degrees, so we get

[tex]x+y=90.[/tex]

Thus, the required system of equations representing the given word problem will be

[tex]x+y=90,\\\\x-y=8.[/tex]

Option (A) is CORRECT.

Final answer:

a. The equation for the line in point-slope form is y + 9 = 4(x - 9), with a slope of 4.

b. The equation can be rewritten in standard form as 4x - y = 45.

Explanation:

a. To write the equation for the line in point-slope form, we need to determine the slope (m) and one point on the line (x1, y1).

The slope can be calculated using the formula m = (y2 - y1) / (x2 - x1).

Taking the points (9, -9) and (10, -5), we can substitute the values into the formula to get m = (-5 - (-9)) / (10 - 9) = 4 / 1 = 4.

Now we can use the formula y - y1 = m(x - x1) with the point (9, -9) to get y - (-9) = 4(x - 9). Simplifying, we have y + 9 = 4x - 36.

b. To rewrite the equation in standard form, we need to bring the equation to the form Ax + By = C, where A, B, and C are integers.

Starting from the point-slope form, we can expand and simplify the equation to get y + 9 = 4x - 36 becomes y = 4x - 45.

To make all the coefficients integers, we can multiply the equation by 5 to get 5y = 20x - 225, rearrange the terms as -20x + 5y = -225, and divide every term by -5 to get the standard form 4x - y = 45.

Answer:

its the last one number 4

Step-by-step explanation:

The system of linear inequalities that includes the point (2, 1) in its solution set is y ≥ 2x - 3 and y ≤ -2x + 5.

The system of linear inequalities that has the point (2, 1) in its solution set can be represented by the inequalities:

To determine if the point (2, 1) satisfies these inequalities, we can substitute the x and y values into each inequality and check if the resulting statements are true. In this case, 1 is indeed greater than or equal to 2(2) - 3, and 1 is also less than or equal to -2(2) + 5, so the point (2, 1) is indeed in the solution set of this system of linear inequalities.

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25 x 2 = 50

140-50 = 90 dollars left

Answer:

63,360 ft/h

Step-by-step explanation:

Answer:

first one is (constant)

second answer is (slope)

the third answer is 2

Step-by-step explanation:

First, you add 8 and 6 which will be 14. Since it's asking for the first four, it would be 4 over 14.

You can reduce that which is always a good idea and it comes out to be 2 over 7. That because you would divide both the top and bottom (like usual) by 2 each.

If you would want it as a percent, you would turn it into a decimal first. The decimal would be .02857. That's of course if you divide 2 and 7 like normal.

From there you would move the decimal point over two places making it 28.57 percent.

Hope this helps!!

Answer:

D=(-∞,∞) Range = [0, ∞)

Step-by-step explanation:

V(r) =5πr²

Firstly we have to work with π as ≈ 3.14 so that we can make it better, by doing this we reveal it more clearly its quadratic form

V(r)= 15.71r²

As there is no restriction algebraically speaking. The Domain is all the Real Line. This is a Total Function.

As for the Range, since any negative value plugged into x² will turn into a positive one we'll only have positive results for y to each entry of x. So the Range is f(x) ≥0

As you can check it below.

Answer:

B I took the test and got it right

Step-by-step explanation:

A. The distance around a closed figure is the correct answer.

Explanation:

The definition of perimeter is : The summation of the outer sides of any closed figure. Like in a rectangle, its the sum of all the four sides. In a circle, its the measure of the outline of the circle also called the circumference.

Hence, the distance around a closed figure is called its perimeter.

The value of k is 0.05.

The exponential growth function is: A = 28e^kt

Where

A = future value of population

e = 2.718

k = growth rate

t = time

The  exponential growth function can be written as:

36 = 28 x e^k 5

log(36/28) ÷ log(e) ÷ 5 = 0.05

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