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f(x) can be written in the form (x+m)^(2)+n. Find the value of m and the value of n. Amover(a) m A

33)\newlinef(x) f(x) can be written in the form (x+m)2+n (x+m)^{2}+n .\newlineFind the value of m m and the value of n n .\newlineAmover(a) m\newlineA

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Sin, cos, and tan of special anglesright chevron icon

Full solution

Q. 33)\newlinef(x) f(x) can be written in the form (x+m)2+n (x+m)^{2}+n .\newlineFind the value of m m and the value of n n .\newlineAmover(a) m\newlineA
  1. Expand Expression: First, let's expand (x+m)2(x+m)^{2} to see what it looks like.\newline(x+m)2=x2+2mx+m2(x+m)^{2} = x^2 + 2mx + m^2
  2. Compare Expanded Form: Now, we need to compare the expanded form x2+2mx+m2+nx^2 + 2mx + m^2 + n to the given function f(x)=Amover(a)mf(x) = \frac{A}{m}over(a) m. But wait, there seems to be a mistake here. The given function f(x)=Amover(a)mf(x) = \frac{A}{m}over(a) m doesn't make sense. It looks like there's some information missing or it's written incorrectly.

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