How do you solve $49 x^{2} - 56 x + 15 = 0$ $49x ^ { 2} - 56x + 15= 0$ ?

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How do you solve $49 x^{2} - 56 x + 15 = 0$ $49x ^ { 2} - 56x + 15= 0$ ?

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Answer 1 · 2017-05-28T19:03:46

$\frac{5}{7} and \frac{3}{7}$ $5/7 and 3/7$

Explanation:

Solve this quadratic equation methodically:
$y = 49 x^{2} - 56 x + 15 = 0$ $y = 49x^2 - 56x + 15 = 0$
Use the new Transforming Method (Socratic, Google Search)
Transformed equation:
$y' = x^2 - 56x + 735 = 0$ (ac = 49(15) = 735)
Proceeding: Find the 2 real roots of y', then, divide them by a = 49.
Find 2 real roots knowing sum (-b = 56) and product (ac = 735).
Compose factor pairs of (735) --> ...(5, 147)(7, 105)(21, 35).
This sum is (35 + 21 = 56 = -b). Therefore, the 2 real roots of y' are:
35, and 21. Back to original y, the 2 real roots are:
$x1 = 35/a = 35/49 = 5/7$ and $x2 = 21/(a) = 21/49 = 3/7$

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How do you solve $49 x^{2} - 56 x + 15 = 0$ $49x ^ { 2} - 56x + 15= 0$ ?

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How do you solve 49x ^ { 2} - 56x + 15= 049x2−56x+15=049x ^ { 2} - 56x + 15= 0?

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Explanation:

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How do you solve $49 x^{2} - 56 x + 15 = 0$ $49x ^ { 2} - 56x + 15= 0$ ?