Question
Elsa used the multiplication table below to write ratios that are equivalent to StartFraction 12 Over 4 EndFraction.
A multiplication table.
One number is missing from the equivalent ratio, as shown.
StartFraction blank Over 12 EndFraction
What is the missing number?
6
18
24
36
A multiplication table.
One number is missing from the equivalent ratio, as shown.
StartFraction blank Over 12 EndFraction
What is the missing number?
6
18
24
36
Answers
GPT-4o mini
To find the missing number in the equivalent ratio \( \frac{\text{blank}}{12} \) that is equivalent to \( \frac{12}{4} \), we can first simplify \( \frac{12}{4} \):
\[
\frac{12}{4} = 3
\]
Now, to find an equivalent ratio, we will set up the equivalent ratio \( \frac{3}{1} \) (since 3 is the simplified form of \( \frac{12}{4} \)) and express it in terms of the new ratio \( \frac{x}{12} \):
To find \( x \), we can set up the proportion:
\[
\frac{3}{1} = \frac{x}{12}
\]
Now, cross-multiply:
\[
3 \cdot 12 = 1 \cdot x
\]
This simplifies to:
\[
36 = x
\]
Thus, the missing number is \( 36 \).
\[
\frac{12}{4} = 3
\]
Now, to find an equivalent ratio, we will set up the equivalent ratio \( \frac{3}{1} \) (since 3 is the simplified form of \( \frac{12}{4} \)) and express it in terms of the new ratio \( \frac{x}{12} \):
To find \( x \), we can set up the proportion:
\[
\frac{3}{1} = \frac{x}{12}
\]
Now, cross-multiply:
\[
3 \cdot 12 = 1 \cdot x
\]
This simplifies to:
\[
36 = x
\]
Thus, the missing number is \( 36 \).