Answered

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-Quadratic Equations-write a standard form Quadratic Equation with the given solution.

Quadratic Equationswrite A Standard Form Quadratic Equation With The Given Solution class=

Sagot :

Answer:

x² + 49 = 0

Explanation:

An equation with the form (x - a)(x - b)= 0 has as a solutions x = a and x = b.

In this case, the solutions are x = 7i and x = -7i, so the equation will be:

(x - 7i)(x - (-7i)) = 0

(x - 7i)(x + 7i) = 0

Now, we need to apply the distributive property, so:

x(x) + x(7i) - 7i(x) - 7i(7i) = 0

x² + 7xi - 7xi - 49i² = 0

x² - 49i² = 0

Since, i² = -1, we get:

x² - 49(-1) = 0

x² + 49 = 0

Therefore, the quadratic equation in standard form is:

x² + 49 = 0

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