Math

QuestionFactor the quadratic equation 3p2+32p+203p^{2}+32p+20.

Studdy Solution

STEP 1

Assumptions1. The given equation is a quadratic equation in the form ax+bx+cax^{} + bx + c . We need to factorize the equation into the form (dx+e)(fx+g)(dx + e)(fx + g)

STEP 2

The quadratic equation given is p2+32p+20p^{2}+32p+20.

STEP 3

To factorize the quadratic equation, we need to find two numbers that add up to the coefficient of pp (which is32) and multiply to give the product of the coefficient of p2p^{2} (which is3) and the constant term (which is20).
So we need to find two numbers that satisfy the following conditions1. Their sum is equal to32.
2. Their product is equal to 3times20=603 \\times20 =60.

STEP 4

The two numbers that satisfy these conditions are20 and12, because1. 20+12=3220 +12 =32
2. 20times12=24020 \\times12 =240

STEP 5

Now, we rewrite the middle term of the quadratic equation (the term with pp) as the sum of the terms 20p20p and 12p12p.
So the equation 3p2+32p+203p^{2}+32p+20 becomes 3p2+20p+12p+203p^{2}+20p+12p+20.

STEP 6

Next, we group the terms to factor by grouping3p2+20p+12p+20=(3p2+20p)+(12p+20)3p^{2}+20p+12p+20 = (3p^{2}+20p) + (12p+20)

STEP 7

Now, we factor out the greatest common factor from each group(3p2+20p)+(12p+20)=p(3p+20)+4(3p+20)(3p^{2}+20p) + (12p+20) = p(3p+20) +4(3p+20)

STEP 8

Notice that the terms in the parentheses are the same. We can factor out the common binomial term (3p+20)(3p+20)p(3p+20)+4(3p+20)=(p+4)(3p+20)p(3p+20) +4(3p+20) = (p+4)(3p+20)So, the factored form of the quadratic equation 3p2+32p+203p^{2}+32p+20 is (p+4)(3p+20)(p+4)(3p+20).

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