Given that a and B are opposite to each other, C and D are reciprocal to each other, | e | = 2, find the value of formula 2 (a + b) + 2CD + E

Given that a and B are opposite to each other, C and D are reciprocal to each other, | e | = 2, find the value of formula 2 (a + b) + 2CD + E

a. If B is opposite to each other, then a + B = 0
c. If D is reciprocal to each other, then CD = 1
If the absolute value of E is equal to 2, then E is equal to plus or minus 2, so the original formula = 0 or 4

Given that a and B are opposite numbers, C and D are reciprocal numbers, and the absolute value of M is equal to 2, find the value of (a + b) / (c + D) + m-2cd

a. B is opposite to each other, C and D are reciprocal to each other, the absolute value of M is 2A + B = 0, CD = 1, M = 2 or - 2 (a + b) / (c + D) + m-2cd = 0 / (c + D) + m-2 * 1 = 0 + m-2m = 2, the original formula is = 0m = - 2, the original formula is = - 4 Hello, I'm glad to answer for you, outsiderl will answer for you

The absolute value of M is 3. The value of a - (- b) + m - 2CD is calculated

A - (- b) = a + B = 0; m = 3 or - 3; CD = 1
The result is 1 or - 5