What are the solutions to $5x^2+27x+10=0$ ?

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What are the solutions to $5x^2+27x+10=0$ ?

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Answer 1 · 2017-06-15T20:43:05

$x=-5" or " x=-2/5$

Explanation:

$"factorise by 'splitting' the term in x"$

$rArr5x^2+25x+2x+10=0larr 25x+2x=27x$

$rArrcolor(red)(5x)(x+5)+color(red)(2)(x+5)=0$

$rArr(x+5)(color(red)(5x+2))=0$

$"equating each factor to zero"$

$rArrx+5=0rArrx=-5$

$5x+2=0rArrx=-2/5$

Answer 2 · 2017-06-16T03:20:24

$- 5$ and $- 2/5$

Explanation:

Solving by the new Transforming Method (Google, Socratic Search).
$y = 5x^2 + 27x + 10 = 0$
Transformed equation:
$y' = x^2 + 27x + 50 = 0$ --> (ac = 50)
Proceeding: Find 2 real roots of y', then, divide them by a = 5.
Find 2 real roots knowing sum (-b = -27) and product (c = 50). They are -2 and -25.
Back to y, the 2 real roots are:
$- 2/a = - 2/5$ , and $- 25/a = - 25/5 = - 5$
NOTE:
There are no factoring by grouping and no solving the 2 binomials.

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What are the solutions to $5x^2+27x+10=0$ ?

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What are the solutions to 5x^2+27x+10=05x^2+27x+10=0?

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What are the solutions to $5x^2+27x+10=0$ ?