Solving proportions using cross products

To solve the proportion 1/2 = x/18, we can use the cross product method.

First, we multiply the numerator of the first ratio (1) by the denominator of the second ratio (18):

1 * 18 = 18

Next, we multiply the denominator of the first ratio (2) by the numerator of the second ratio (x):

2 * x = 2x

Since the cross products are equal, we can set up an equation:

18 = 2x

Simplifying the equation, we divide both sides by 2:

18/2 = 2x/2

9 = x

Therefore, the value of x is 9.

Solving proportions using cross products
32/12 = 64/k

To solve the proportion 32/12 = 64/k, we can use the cross product method.

First, we multiply the numerator of the first ratio (32) by the denominator of the second ratio (k):

32 * k = 32k

Next, we multiply the denominator of the first ratio (12) by the numerator of the second ratio (64):

12 * 64 = 768

Since the cross products are equal, we can set up an equation:

32k = 768

To solve for k, we divide both sides of the equation by 32:

32k / 32 = 768 / 32

k = 24

Therefore, the value of k is 24.

If 3 pounds of apples cost $0.90, what is the cost of 5 pounds of apples at the same rate?

To solve this problem, we can set up a proportion to find the cost of 5 pounds of apples.

Let the cost of 5 pounds of apples be represented by x.

We can set up the proportion: 3 pounds / $0.90 = 5 pounds / x

To solve for x, we can use cross products.

(3 pounds)(x) = (5 pounds)($0.90)

3x = 5(0.90)

3x = 4.50

To isolate x, we divide both sides of the equation by 3:

x = 4.50 / 3

x = 1.50

Therefore, the cost of 5 pounds of apples at the same rate is $1.50.