What is the sum of all integers with absolute values greater than 3 but less than 6

What is the sum of all integers with absolute values greater than 3 but less than 6

All integers with absolute values greater than 3 but less than 6:
-4 -5 4 5
He Wei
0

Find all integers with absolute values greater than 2.4 and less than 6

3.4.5
-3.-4.-5

Integers with absolute values less than 6 and greater than are-------------
Integers with absolute values less than 6 and greater than 3 are-------------

According to the meaning of the title, the formula is as follows:
three

Find the sum of all integers between the absolute value of - 23 / 5 and the absolute value of - 3 / 2
-23 / 5 is minus 23 / 5 - 2 / 3 is minus 3 / 2

Minus twenty-three fifths, that is: - 4.6
Minus three-thirds, that is: - 1.5
If the absolute value is between 1.5 and 4.6, the integer will have 2, 3 and 4, so the sum is 9

Integers with absolute values less than 2.5 have______ The product of them is______ ．

According to the meaning of absolute value, there are five integers with absolute value less than 2.5, namely - 2, - 1, 0, 1 and 2. Their product is 0, so the answer is 5, 0

There are () integers with absolute value less than 5.9, and their sum is ()

|x|

The sum of all integers with absolute values less than 9.3 is ()

It's zero. Any absolute value other than zero is one plus one minus. It adds up to 0

The sum of all integers with absolute values greater than 2 and less than 5 is ()
A. 0B. 7C. 14D. 28

All integers with absolute value greater than 2 and less than 5 are: - 4, - 3, 3, 4. Then - 4 + (- 3) + 3 + 4 = 0, so a

What are all integers with absolute values less than 5?

All integers with absolute value less than 5 are 0, ± 1, ± 2, ± 3, ± 4

4、 Find the sum of all nonnegative integers whose absolute value is less than 3.1

Non negative integers with absolute value less than 3.1 are: 0,1,2,3
So the sum is 6