The number of integral values satisfying the inequality x-2x-7-x-34-0 is

(x+2)(x 7)(x+3)^40 We know that (x+3)^4 is always positive So, the inequality becomes, (x+2)(x 7) 0, x 3 ⇒ x ∈ ( 2, 7) The required integral values are { ...

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Standard XII

Mathematics

Properties of Inequalities

The number of...

Question

The number of integral values satisfying the inequality $\frac{(x + 2) (x - 7)}{(x + 3)^{4}} < 0$ is

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Solution

$\frac{(x + 2) (x - 7)}{(x + 3)^{4}} < 0$
We know that $(x + 3)^{4}$ is always positive
So, the inequality becomes,
$(x + 2) (x - 7) < 0, x \neq - 3 \Rightarrow x \in (- 2, 7)$

The required integral values are ${- 1, 0, 1, 2, 3, 4, 5, 6}$
Hence, number of integral values are $8$ .

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The number of integral values satisfying the inequality (x+2)(x−7)(x+3)4<0 is

(x+2)(x−7)(x+3)4<0 We know that (x+3)4 is always positive So, the inequality becomes, (x+2)(x−7)<0, x≠−3⇒x∈(−2,7) The required integral values are {−1,0,1,2,3,4,5,6} Hence, number of integral values are 8.

The number of integral values satisfying the inequality $\frac{(x + 2) (x - 7)}{(x + 3)^{4}} < 0$ is

$\frac{(x + 2) (x - 7)}{(x + 3)^{4}} < 0$
We know that $(x + 3)^{4}$ is always positive
So, the inequality becomes,
$(x + 2) (x - 7) < 0, x \neq - 3 \Rightarrow x \in (- 2, 7)$

The required integral values are ${- 1, 0, 1, 2, 3, 4, 5, 6}$
Hence, number of integral values are $8$ .