Question

part b
circle the answer choice in each box to make each statement true.
the ratio of the number of pennies in jar a to the number of pennies in jar b is ...
diagram a with 3:4, 3:7, etc.
now, jar a has __ jar b
diagram b with \fewer pennies than\, \more pennies than\, \the same number of pennies as\
if jar a now has 24 pennies, then jar b has __ pennies
diagram c with options

Explanation:

Step1: Identify the ratio

The ratio of the number of pennies in jar A to jar B is \( 3:4 \).

Step2: Set up the proportion

Let the number of pennies in jar B be \( x \). We know that \( \frac{24}{x}=\frac{3}{4} \).

Step3: Solve for \( x \)

Cross - multiply: \( 3x = 24\times4 \).
\( 3x=96 \).
Divide both sides by 3: \( x=\frac{96}{3}=32 \).

Answer:

32