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Q: When adding integers with the same sign do you add their absolute values and write the common sign?

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That sounds sound.

For each pair of such integers, find the difference between the absolute values of the two integers and allocate the sign of the bigger number to it.

Adding integers, if they have the same sign, add their absolute values and keep the same sign. Subtracting, change the sign of the 2nd number and the add using rules of addition. Multiplying and dividing, Divide the absolute values, if the signs are the same the answer is positive, if the signs are different the answer is negative.

It is the product of their absolute values with the common sign.

The value of the answer is the sum of the absolute values of the numbers and the sign of the answer is the same as that of the two numbers.

None. Integers can be negative, absolute values cannot. Absiolute values can be rational or irrational fractions, integers cannot.

If the signs are the same, add the absolute values and keep the sign. If the signs are different, subtract the lesser absolute value from the greater absolute value and keep the sign of the number with the greater absolute value.

ADDING: same sign, add and keep that sign. opposite sides, subtract their absolute values and use the sign of the number with the larger absolute value SUBRTRACTING: change the sign of the subtrahend (2nd number) then ADD using rules above.

No. Absolute value applies to the set of real numbers.

The absolute value is always non-negative. So, the absolute values of zero and positive integers are the same as the numbers. However, the absolute values of negative integers are their additive inverses or additive opposites (or positive equivalents).Thus, for example, abs(-3) = +3

First, subtract the absolute values of the integers, then use the greater absolute value's sign.

Yes, you can.

Yes.

The rule in dividing integers is to divide the absolute values. Two positive integers or two negative integers equals positive product. If one integer is positive and the other is negative, the product is negative.

Two integerss add to zero when their absolute values are equal and they have opposite signs.

Addition:1. look for like terms, combine like terms by adding their numerical coefficient. In adding the numerical coefficient, you have to consider the rules in adding integers.a. to add two numbers having like signs, add their absolute values and prefix their common sign, then bring down the literal coefficient.b. to add two numbers having unlike signs, find the difference of their absolute values and prefix to the difference sign of the number having a greater absolute value, then bring down the literal coefficient.Subtraction:1. multiply the subtrahend by -1 and proceed to adding algebraic expression.

-8 + 7 = -1 When adding integers with unlike signs you find the difference between the two absolute values of the numbers, in this case 8-7 = 1, and then use the sign of the number with the greatest absolute value (the number with the greatest distance from zero), which in this case is the -8, in the answer. So the answer is negative one or -1.

To solve equations with absolute values in them, square the absolute value and then take the square root. This works because the square of a negative number is positive, and the square root of that square is the abosolute value of the original number.

When adding or subtacting fractions make sure that the denominators are of the same values if they are not then find the lowest common denominator.

Any ratio of the form p : q where p and q are integers whose absolute values are greater than 1.

An integer that is equal in magnitude to the sum of their absolute values. Its sign is the same as which of the two numbers you are taking the difference from. For example, for the integers 5 and -7. Their absolute values are 5 and 7 so that the sum of the absolute values is 5+7 = 12. Then 5 - (-7) = +12 and -7 - 5 = -12.

Consider the absolute values (the numerical values ignoring the signs) of the two numbers. If these are equal then the sum is equal; otherwise the sum takes the sign of which ever number has the larger absolute value.

Find the two numbers with the largest magnitudes (absolute values). The sum of their squares will be the maximum.

The largest possible values for the integers are 47, 49, and 51.

When the absolute values of the two integers is the same. The absolute value is the value of the number without considering its sign. So, for example, abs(-3) = abs(3) = 3