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22 votes
22 votes
1) Factorize: x^2 - 10x +24

User Superlime
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2 Answers

10 votes
10 votes

We are given with a quadratic equation and we have to factorise it , so let's proceed.


{:\implies \quad \sf x^(2)-10x+24}


{:\implies \quad \sf x^(2)-6x-4x+24}


{:\implies \quad \sf x(x-6)-4(x-6)}


{:\implies \quad \bf \underline{\underline{(x-6)(x-4)}}}

Used Concepts :-

To factorise a quadratic polynomial ax² + bx + c we have to split it's middle term bx into say mx and nx and it will look like ax² + mx + nx + c ,also we should split it such that it follows the both conditions below :-

  • m × n = c × a
  • m + n = b
User PEPEGA
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2.6k points
25 votes
25 votes

To Factorize:


  • \underline{ \sf {x}^(2) - 10x + 24}


~

Solution:


\: \: \: \: \sf \longrightarrow {x}^(2) - 10x + 24


\: \: \: \: \sf \longrightarrow {x}^(2) - 4x - 6x + 24


\: \: \: \: \sf \longrightarrow x(x - 4) - 6(x - 4)


\: \: \: \: \sf \longrightarrow (x - 6)(x - 4)

User MdxBhmt
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2.8k points