Math

QuestionFactorise fully 16120k+225k216 - 120k + 225k^{2}.

Studdy Solution

STEP 1

Assumptions1. The expression to factorise is 16120k+225k16-120 k+225 k^{}

STEP 2

The given expression is a quadratic expression of the form ax2+bx+cax^{2} + bx + c. In this case, a=225k2a =225k^{2}, b=120kb = -120k, and c=16c =16.

STEP 3

We can factorise a quadratic expression by finding two numbers that add up to bb and multiply to cc. However, in this case, the quadratic is not in standard form (ax2+bx+cax^{2} + bx + c). We need to rearrange the terms to put it in standard form.

STEP 4

Rearrange the terms to put the expression in standard form.
225k2120k+16225k^{2} -120k +16

STEP 5

Now, we need to find two numbers that add up to bb and multiply to cc. In this case, b=120b = -120 and c=225×16c =225 \times16.

STEP 6

The two numbers that satisfy these conditions are 30-30 and 30-30 because 30+30=120-30 + -30 = -120 and 30×30=900-30 \times -30 =900.

STEP 7

Now we can rewrite the middle term of the quadratic expression as the sum of the terms 30k-30k and 90k-90k.
225k230k90k+16225k^{2} -30k -90k +16

STEP 8

Next, we group the terms to prepare for factoring by grouping.
(225k230k)(90k16)(225k^{2} -30k) - (90k -16)

STEP 9

Now, we factor out the greatest common factor from each group.
15k(15k2)4(15k2)15k(15k -2) -4(15k -2)

STEP 10

Since the terms in parentheses are the same, we can factor them out to get the final factorised form of the expression.
(15k2)(15k4)(15k -2)(15k -4)Hence, the factorised form of 16120k+225k216-120 k+225 k^{2} is (15k2)(15k4)(15k -2)(15k -4).

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