Question

asked Apr 15, 2022 33.3k views

1 Answer

Kostek · Answer 1 · 2022-04-21T20:53:05+0000

Answer:

$\alpha + \beta = -(b)/(a)$

$\alpha \beta = (c)/(a)$

Explanation:

Given

ax^2 + bx + c = 0

$Roots: \alpha \& \beta$

Required

Show that:

$\alpha + \beta = -(b)/(a)$

$\alpha \beta = (c)/(a)$

ax^2 + bx + c = 0

Divide through by a

(a)/(a)x^2 + (b)/(a)x + (c)/(a) = (0)/(a)

x^2 + (b)/(a)x + (c)/(a) = 0

The general form of a quadratic equation is:

x^2 - (Sum)x + (Product) = 0

By comparison, we have:

-(Sum)x = (b)/(a)x

-(Sum) = (b)/(a)

Sum is calculated as:

$Sum = \alpha + \beta$

So, we have:

$-(\alpha + \beta) = (b)/(a)$

Divide both sides by -1

$\alpha + \beta = -(b)/(a)$

Similarly;

Product = (c)/(a)

Product is calculated as:

$Product = \alpha * \beta$

So, we have:

$\alpha * \beta = (c)/(a)$

$\alpha \beta = (c)/(a)$

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