Which is a true statement?

6.52 < 6.5

-2.8 > -3.5

-11.1 > -10.7

-7.75 < -8.45

Okay, So I'm stuck. I'm thinking its D?
The negatives are really confusing me, I forgot to add the negative sign to the answers last time. Do I look at it like it does not have any negative signs or? I'm not looking for any answers..please don't answer. Just explain.

the answer is b.

The larger a negative number the smaller it is.

Well, let's take a closer look and break it down. In statement D, we have -7.75 and -8.45. When comparing numbers, we usually start by looking at the leftmost digit. In this case, it's the 10s place, which is 7 and 8, respectively.

Since 7 is smaller than 8, we can conclude that -7.75 is smaller than -8.45. So, statement D is actually true. You got it right!

When comparing negative numbers, you can think of them as "flipped" versions of positive numbers on a number line. So, if a negative number has a larger absolute value (ignoring the negative sign), then it's actually considered smaller.

Keep up the good work! Remember, math can get tricky sometimes, but it's all about understanding the concepts and taking it one step at a time.

To determine which statement is true, you can compare the numbers directly.

For statement A, 6.52 < 6.5, this is false. In this case, 6.52 is greater than 6.5.

For statement B, -2.8 > -3.5, this is true. When comparing negative numbers, the smaller absolute value is actually considered the larger number. So, -2.8 is greater than -3.5.

For statement C, -11.1 > -10.7, this is false. Just like statement A, this is comparing negative numbers and -11.1 is less than -10.7.

For statement D, -7.75 < -8.45, this is true. Again, when comparing negative numbers, the smaller absolute value is considered the greater number. So, -7.75 is less than -8.45.

In summary, the correct statement is:

-2.8 > -3.5

To determine which statement is true, you need to compare the values on both sides of the inequality signs. Let's break it down:

Statement A: 6.52 < 6.5
In this case, 6.52 is a larger number than 6.5. However, the less than sign (<) indicates that the value on the left (6.52) is smaller than the value on the right (6.5). Therefore, this statement is false.

Statement B: -2.8 > -3.5
Comparing the absolute values, -2.8 is smaller than -3.5. However, the greater than sign (>) indicates that the value on the left (-2.8) is actually greater than the value on the right (-3.5). So, this statement is true.

Statement C: -11.1 > -10.7
Again, comparing the absolute values, -11.1 is smaller than -10.7. The greater than sign (>) indicates that the value on the left (-11.1) is actually greater than the value on the right (-10.7). This statement is also true.

Statement D: -7.75 < -8.45
Comparing the absolute values, -7.75 is larger than -8.45. However, the less than sign (<) indicates that the value on the left (-7.75) is smaller than the value on the right (-8.45). Therefore, this statement is false.

In summary, statements B and C are true, while statements A and D are false.

When dealing with negative numbers, it's important to pay attention to the inequality signs and remember that the negative sign affects the magnitude of the number. In both cases,

A negative value is smaller than a positive value of the same absolute value.
A negative value is greater than a negative value with a larger absolute value.

Remembering these concepts will help you determine the correct order of numbers when comparing them.