Learn How To Factorize Quadratic Expressions With Ease: X²+12X+35

x²+12x+35

(x+7)(x+5)

The given expression is x²+12x+35.

We can factorize this expression by splitting the middle term and finding two numbers whose sum is 12 and whose product is 35.

We can write:

x²+7x+5x+35

Now, we can factorize the first two terms together and the last two terms together:

x(x+7)+5(x+7)

Now, we can factor out the common factor of (x+7) to get the final factorization:

(x+7)(x+5)

Therefore, the factorization of the given expression is:

x²+12x+35 = (x+7)(x+5)

More Answers:
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How To Solve A Division Problem Using The Dividend-Divisor-Quotient Formula
How To Factor Quadratic Expressions: Step-By-Step Guide With Example: X²-7X-44

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