If the sum of (2xy+4xy) is subtiracted from (2x^(2)y+10 xy) What will be the Answer?

Identify terms to subtract: Identify the terms to be subtracted. The sum of (2xy + 4xy) needs to be subtracted from (2x^2y + 10xy).Combine like terms: Combine like terms in the sum (2xy + 4xy). 2xy + 4xy = 6xy.Subtract terms: Subtract the sum 6xy from each term in (2x^2y + 10xy). First, subtract 6xy from 2x^2y, which remains unchanged because they are not like terms. Second, subtract 6xy from 10xy.Perform subtraction: Perform the subtraction 10xy - 6xy. 10xy - 6xy = 4xy.Combine final expression: Combine the result of the subtraction with the unchanged term 2x^2y. The final expression is 2x^2y + 4xy.

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If the sum of
(2xy+4xy) is subtiracted from
(2x^(2)y+10 xy) What will be the Answer?

If the sum of $(2 x y+4 x y)$ is subtiracted from $\left(2 x^{2} y+10 x y\right)$ What will be the Answer?

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Precalculus

Evaluate rational exponents

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Q. If the sum of

(2 x y+4 x y)

is subtiracted from

\left(2 x^{2} y+10 x y\right)

What will be the Answer?

Identify terms to subtract: Identify the terms to be subtracted. $\newline$ The sum of $(2xy + 4xy)$ needs to be subtracted from $(2x^2y + 10xy)$ .
Combine like terms: Combine like terms in the sum $(2xy + 4xy)$ . $2xy + 4xy = 6xy$ .
Subtract terms: Subtract the sum $6xy$ from each term in $(2x^2y + 10xy)$ . First, subtract $6xy$ from $2x^2y$ , which remains unchanged because they are not like terms. Second, subtract $6xy$ from $10xy$ .
Perform subtraction: Perform the subtraction $10xy - 6xy$ . $\newline$ $10xy - 6xy = 4xy$ .
Combine final expression: Combine the result of the subtraction with the unchanged term $2x^2y$ . The final expression is $2x^2y + 4xy$ .