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31 votes
31 votes
The quadratic x^-4x-21 can be written in the form (x+a)^+b.Find the values of a and b

User Recnac
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1 Answer

23 votes
23 votes

Answer: (x - 4)² - 25

Explanation:


{ \boxed{ \tt{ \: {x}^(2) - 4x - 21 \: }}}

» Let us use completing perfect squares to find the final expression.

☑ When completing squares, we first find the "square of the half of the sum"

  • sum is -4


{ \boxed{ \tt{square \: of \: sums \: half = {( ( - 4)/(2) )}^(2) = {( - 2)}^(2) = 4 }}}

» Then we add the result to x² and -21


= { \tt{( {x}^(2) - 4x + 4) + ( - 21 - 4) }} \\ = { \tt{ {(x - 2)}^(2) - 25 }}

  • a is -2
  • b is -25
User DrCopyPaste
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