How do you solve quadratic equation $4x^2+11x-20=0$ ?

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How do you solve quadratic equation $4x^2+11x-20=0$ ?

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Answer 1 · 2016-11-26T10:38:39

$x = 5/4 and x = 4$

Explanation:

The first method to check for solving a quadratic equation is whether the expression factorises.

$4x^2 +11x-20 = 0$

"Find factors of 4 and 20 which subtract to make 11"

Note that 11 is ODD, so the factors must combine to give one ODD and and one even number.

That immediately eliminates $2xx2$ and $10xx2$ as possible factors of 4 and 20
( because their multiples will always be even.)

When trying different combinations, remember not to have a common factor in any horizontal row.

Find factors and cross-multiply. Subtract the products to get 11.

$" "ul(4" "20)$
$" "4" "5" "rarr1 xx 5 = 5$
$" "1" "4" "rarr 4xx4 = ul16$
$color(white)(xxxxxxxxxxxxxxxxxxx)11$ the difference is 11

We have the correct factors, now work with the signs.

MINUS $20$ means that the signs must be different.
PLUS $11$ means there must be more positives.
Fill in the correct signs, starting from $color(red)(+11)$

$color(red)(+11) " "rarr color(red)(+16) and color(blue)(-5)$

$" "ul(4" "20)$
$" "4" "5" "rarr 1 xx 5 = color(blue)(-5)$
$" "1" "4" "rarr 4xx4 = ulcolor(red)(+16)$
$color(white)(xxxxxxxxxxxxxxxxxxx)color(red)(+11)$

Now fill in the signs next to the correct factors:

$" "ul(4" "20)$
$" "4" "color(blue)(-5)" "rarr 1 xx color(blue)(-5) = color(blue)(-5)$
$" "1" "color(red)(+4)" "rarr 4xxcolor(red)(+4) = ulcolor(red)(+16)$
$color(white)(xxxxxxxxxxxxxxxxxxxxx)color(red)(+11)$

Now you have the factors: Top row is one bracket and bottom row is the other factor.

$4x^2 +11x-20 = 0$
$(4x-5)(x+4) =0$

Letting each factor be equal to 0 gives the 2 solutions

$4x-5 =0 " "rarr " " 4x=5 rarr x= 5/4$
$x+4=0" "rarr" "x=-4$

Answer 2 · 2017-01-12T13:45:31

$5/4 and -4$

Explanation:

$y = 4x^2 + 11x - 20 = 0$ .
Use the new Transforming Method (Socratic Search)
Transformed equation: $y' = x^2 + 11x - 80 = 0$ .
First, find the 2 real roots of y' that have opposite signs (ac < 0). Then, divide them by (a).
Factor pairs of (- 80) --> ...(4, - 20)(5, -16). This last sum is (-11 = -b). There for the 2 real roots of y' are: 5 and - 16.
The 2 real roots of y are: $5/4$ and $- 16/4 = - 4$

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How do you solve quadratic equation $4x^2+11x-20=0$ ?

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