Evaluate- x - 1 x - 27 x - 3 dx

Evaluating the integral ∫ (x + 1) (x + 2)^7 (x + 3) dx⇒∫ (x + 2 1) (x + 2)^7 (x + 2 + 1) dxsubstituting t = x + 2 and dx = dt we get⇒∫t^7(t 1)(t + 1) dt0ex ...

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Byju's Answer

Standard XII

Mathematics

Derivative of Standard Inverse Trigonometric Functions

Evaluate:∫ x ...

Question

Evaluate: $\int (x + 1) {(x + 2)}^{7} (x + 3) d x$

$[\frac{{(x + 2)}^{10}}{10}] - [\frac{{(x + 2)}^{8}}{8}] + c$

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$[\frac{{(x + 2)}^{2}}{2}] - [\frac{{(x + 2)}^{8}}{8}] - [\frac{{(x + 3)}^{2}}{2}] + c$

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$[\frac{{(x + 1)}^{10}}{10}] + c$

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$[\frac{{(x + 1)}^{2}}{2}] + [\frac{{(x + 2)}^{8}}{8}] + [\frac{{(x + 3)}^{2}}{2}] + c$

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$[\frac{{(x + 2)}^{9}}{9}] - [\frac{{(x + 2)}^{7}}{7}] + c$

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Solution

The correct option is A
$[\frac{{(x + 2)}^{10}}{10}] - [\frac{{(x + 2)}^{8}}{8}] + c$

Evaluating the integral $\int (x + 1) {(x + 2)}^{7} (x + 3) d x$
$\Rightarrow \int (x + 2 - 1) {(x + 2)}^{7} (x + 2 + 1) d x$
substituting $t = x + 2$ and $d x = d t$ we get
$\Rightarrow \int t^{7} (t - 1) (t + 1) d t \Rightarrow \int t^{7} (t^{2} - 1^{2}) d t [∵ (a - b) (a + b) = a^{2} - b^{2}] \Rightarrow \int (t^{9} - t^{7}) d t \Rightarrow \int t^{9} d t - \int t^{7} d t \Rightarrow \frac{t^{10}}{10} - \frac{t^{8}}{8} + C [C i s a n i n t e g r a t i n g c o n s \tan t] \Rightarrow \frac{{(x + 2)}^{10}}{10} - \frac{{(x + 2)}^{8}}{8} + C [s u b s t i t u t i n g b a c k t = (x + 2)]$
Hence, option A is the correct answer.

Suggest Corrections

Evaluate:∫(x+1)(x+2)7(x+3)dx

Evaluate: $\int (x + 1) {(x + 2)}^{7} (x + 3) d x$