How do you solve $(x + 13) (x - 19) \geq 0$ $(x + 13)(x - 19)>=0$ ?

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How do you solve $(x + 13) (x - 19) \geq 0$ $(x + 13)(x - 19)>=0$ ?

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Answer 1 · 2015-08-10T19:49:47

Answer: $x \in (- \infty; - 13 > \cup < 19; + \infty)$ $x in (-oo;-13> uu <19;+oo)$

Explanation:

From tjhe inequality you can see, that your function has 2 zeros: $x_{1} = - 13$ $x_1=-13$ and $x_{2} = 19$ $x_2=19$ and the function takes positive values when $x$ $x$ goes to $+ \infty$ $+oo$ and $- \infty$ $-oo$

graph{x^2-6x-247 [-40, 40, -20, 20]}

so you can write the solution: $x \in (- \infty; - 13 > \cup < 19; + \infty)$ $x in (-oo;-13> uu <19;+oo)$

Answer 2 · 2015-08-16T12:48:51

Solve $(x + 13) (x - 19) \geq 0$ $(x + 13)(x - 19) >= 0$

Ans: (-infinity, -13] and [19, infinity)

Explanation:

The 2 x-intercepts (real roots) are x = -13 and x = 19.
Use the algebraic method to solve the inequality $f (x) \geq 0$ $f(x) >= 0$ . Between the 2 real roots f(x) < 0 as opposite to the side of a = 1.. Outside the interval (-13, 19), $f (x) \geq 0 .$ $f(x) >= 0.$
Answer by half closed intervals: (-infinity, -13] and [19, infinity).
The critical points (-13) and (19) are included in the solution set.

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How do you solve $(x + 13) (x - 19) \geq 0$ $(x + 13)(x - 19)>=0$ ?

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