1 Answer

Starikovs · Answer 1 · 2022-08-21T12:31:01+0000

Answer:

and
.

Explanation:

The difference between two consecutive odd integers is
.

Let
denote the smaller one of the two numbers (
x > 0 .) The other number would be
(x + 2) .

$x \, (x + 2) = 195$ .

Thus,
$x^(2) + 2\, x - 195 = 0$ .

Solve this equation for
using the quadratic formula:

$\begin{aligned}x_(1) &= \frac{-2 + \sqrt{2^(2) - 4* (-195)}}{2} \\ &= (-2 + √(784))/(2) \\ &= (-2 + 28)/(2) \\ &= 13\end{aligned}$ .

$\begin{aligned}x_(2) &= \frac{-2 - \sqrt{2^(2) - 4* (-195)}}{2}\\ &= (-2 - 28)/(2) \\ &= -15\end{aligned}$ .

Only
x_(1) = 13 is a valid solution since
x > 0 by assumption.

Therefore, the smaller one of the two odd numbers would be
. The other integer would be
13 + 2 = 15 .

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