The values of a and b in w^2 - 11w + 18 = (w - a)(w - b) is 2 and 9.
We have given the polynomial w^2 - 11w + 18
First to find the factor form and then
To determine the value of a and b
The Polynomial is an expression that involves only the operations of addition, subtraction, and multiplication of variables.
The given the polynomial is w^2- 11w + 18
= w^2 - 9w - 2w + 18
= w(w - 9) -2(w - 9)
= (w - 2)(w - 9)
This implies that a=2 and b=9
Therefore, the values of a and b in w^2 - 11w + 18 = (w - a)(w - b) is 2 and 9
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