Which sign makes the statement true?

To determine which sign makes the statement true, we can compare the two numbers:

7.65 and 6.5.

Since 7.65 is greater than 6.5, the correct sign to use is:

7.65 > 6.5

So, the statement that makes it true is ">".

Which sign makes the statement true?
1/2 ? -2

To determine which sign makes the statement true, we can compare \( \frac{1}{2} \) and \(-2\).

• \( \frac{1}{2} \) is equal to 0.5, which is greater than -2.

So, the correct sign to use is:

\[ \frac{1}{2} > -2 \]

Thus, the statement that makes it true is ">".

Which sign makes the statement true?
-15 1/2 ? -15.5

To determine which sign makes the statement true, we need to compare \(-15 \frac{1}{2}\) and \(-15.5\).

First, let's convert \(-15 \frac{1}{2}\) into a decimal: \[ -15 \frac{1}{2} = -15.5 \]

Now we can compare:

• \(-15.5\) is equal to \(-15.5\).

So the correct sign to use is: \[ -15 \frac{1}{2} = -15.5 \]

Thus, the statement that makes it true is "=".

Which sign makes the statement true?
4.5 ? -17

To determine which sign makes the statement true, we need to compare \(4.5\) and \(-17\).

Since \(4.5\) is greater than \(-17\), the correct sign to use is:

\[ 4.5 > -17 \]

Thus, the statement that makes it true is ">".

Which sign makes the statement true?
0.5 ? 1/2

To determine which sign makes the statement true, let's compare \(0.5\) and \(\frac{1}{2}\).

We know that: \[ \frac{1}{2} = 0.5 \]

Since both values are equal, the correct sign to use is:

\[ 0.5 = \frac{1}{2} \]

Thus, the statement that makes it true is "=".

Which sign makes the statement true?
12.91 ? -13.6

To determine which sign makes the statement true, we need to compare \(12.91\) and \(-13.6\).

Since \(12.91\) is greater than \(-13.6\), the correct sign to use is:

\[ 12.91 > -13.6 \]

Thus, the statement that makes it true is ">".