How do you solve the quadratic $3 x^{2} - 2 x = 2 x + 7$ $3x^2-2x=2x+7$ using any method?

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How do you solve the quadratic $3 x^{2} - 2 x = 2 x + 7$ $3x^2-2x=2x+7$ using any method?

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Answer 1 · 2016-11-04T13:44:08

$x = + \frac{7}{3} and x = - 1$ $x= + 7/3 and x=-1$

Explanation:

Given: $3 x^{2} - 2 x = 2 x + 7$ $" "3x^2-2x=2x+7$

Subtract $2 x$ $2x$ and $7$ $7$ from both sides

$3 x^{2} - 4 x - 7 = 0$ $3x^2-4x-7=0$

7 is a prime number so does not share any common factors other than 1 with the other coefficients.

Compare to the standardised equations:

$y = a x^{2} + b x + c; x = \frac{- b \pm \sqrt{b^{2} - 4 a c}}{2 a}$ $y=ax^2+bx+c" ; "x=(-b+-sqrt(b^2-4ac))/(2a)$

Where $a = 3; b = - 4; c = - 7$ $" "a=3"; "b=-4"; "c=-7$ giving:

$x = \frac{+ 4 \pm \sqrt{{(- 4)}^{2} - 4 (3) (- 7)}}{2 (3)}$ $x=(+4+-sqrt((-4)^2-4(3)(-7)))/(2(3))$

$x = \frac{2}{3} \pm \frac{\sqrt{16 + 84}}{6}$ $x=2/3+-sqrt(16+84)/6$

$x = \frac{2}{3} \pm \frac{10}{6}$ $x=2/3+-10/6$

$\Rightarrow x = + \frac{7}{3} and x = - 1$ $=>x= + 7/3 and x=-1$

~~~~~~~~~~~~~~~~~~~~~~~~~~~~
Tony B

Answer 2 · 2016-11-04T14:23:56

Same solution but using completing the square. The process introduces an error that has to be corrected by the inclusion of $k$ $k$
Takes longer to explain than do the maths.

Explanation:

Given: $3 x^{2} - 4 x - 7 = 0$ $" "3x^2-4x-7=0$ ............................Equation(1)

$Completing the square$ $color(blue)("Completing the square")$

Write as: $3 (x^{2} - \frac{4}{3} x) - 7 = 0$ $3(x^2-4/3x)-7=0$

Let the constant of correction be $k$ $k$

At this point $k = 0$ $k=0$

Write as: $3 (x^{2} - \frac{4}{3} x) - 7 + k = 0$ $3(x^2-4/3x)-7+k=0$

Take the square from $x^{2}$ $x^2$ outside the brackets

$3 {(x - \frac{4}{3} x)}^{2} - 7 + k = 0$ $3(x-4/3x)^2-7+k=0$

Halve the coefficient of $x$ $x$ so $- \frac{4}{3} x$ $-4/3x$ becomes $- \frac{4}{6} x$ $-4/6x$

$The \frac{4}{6} is not simplified on purpose$ $"The "4/6" is not simplified on purpose"$

$3 {(x - \frac{4}{6} x)}^{2} - 7 + k = 0$ $3(x-4/6x)^2-7+k=0$

Now get rid of the $x$ $x$ from $- \frac{4}{6} x$ $-4/6x$

$3 {(x - \frac{4}{6})}^{2} - 7 + k = 0$ $color(red)(3)(xcolor(green)(-4/6))^2-7+k=0$ ............................Equation(2)
~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
We now have to find the value of $k$ $k$ so that the overall value of equation(2) is the same as that of equation(1)

The error comes from the term $3 {(- \frac{4}{6})}^{2}$ $color(red)(3)(color(green)(-4/6))^2$ which is additional to that in the original equation(1).

Equation(1) $\to 3 x^{2} - 4 x - 7 = 0$ $->3x^2-4x-7=0$
Equation(2) $-> 3x^2-4xcolor(magenta)(+(cancel(16)^4)/(cancel(12)^3))-7+k=0$
~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
$color(white)(.)$

So from equation(2) we have

$color(red)(3)(color(green)(-4/6))^2+k=0 " "=>" "k=-4/3larr" gets rid of the error"$

So equation(2) becomes:

$3(x-2/3)^2-7-4/3=0$

$3(x-2/3)^2-25/3=0 larr" completed square"$

~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
$color(blue)("Solving for "x)$

$=>(x-2/3)^2 = 25/9$

$x=2/3+-sqrt(25/9)$

$x=2/3+-5/3$

$x= 7/3 or x= -1$

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2 Answers

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