Ask & Answer Question

Definite Integrals Maths Integrals Maths Class 12th

Let P(x) = x² + bx + c be a quadratic polynomial with real coefficients such that ∫₀¹ P(x)dx = 1 and P(x) leaves remainder 5 when it is divided by (x - 2). Then the value of 9(b + c) is equal to:

Option 1 -

Option 2 -

Option 3 -

Option 4 -

3 Views | Posted a month ago

Asked by Shiksha User

1 Answer

Answered by

alok kumar singh | Contributor-Level 10

a month ago

Correct Option - 4

Detailed Solution:

P (x) = x² + bx + c.
Given ∫? ¹ P (x) dx = 1.
∫? ¹ (x² + bx + c) dx = [x³/3 + bx²/2 + cx] from 0 to 1 = 1/3 + b/2 + c = 1.
2 + 3b + 6c = 6 => 3b + 6c = 4 - (i)
When P (x) is divided by (x-2), the remainder is 5. So, P (2) = 5.
(2)² + b (2) + c = 5 => 4 + 2b + c = 5 => 2b + c = 1 - (ii)
From (ii), c = 1 - 2b. Substitute into (i):
3b + 6 (1 - 2b) = 4
3b + 6 - 12b = 4
-9b = -2 => b = 2/9.
c = 1 - 2 (2/9) = 1 - 4/9 = 5/9.
We need to find 9 (b+c).
9 (2/9 + 5/9) = 9 (7/9) = 7.

0 Upvotes 0 Downvotes

Similar Questions for you

$\int \frac{(s i n x - c o s x) s i n^{2} x}{s i n x c o s^{2} x + t a n x s i n^{3} x} d x$ is equal to

alok kumar singh

$\int \frac{(s i n x - c o s x) s i n^{2} x}{t a n x (s i n^{3} x + c o s^{3} x)} d x$

$\int \frac{(s i n x - c o s x) s i n x c o s x}{s i n^{3} x + c o s^{3} x} d x$ , put sin³x + cos³x = t(3 sin²x×cosx – 3cos²xsinx) dx = dt

-> $\frac{1}{3} \int \frac{d t}{t}$

$= \frac{l n t}{3} + c$

$= \frac{l n | s i n^{3} x + c o s^{3} x |}{3} + c$

The value of the integral $\int_{1}^{3} [x^{2} - 2 x - 2] d x,$ where [x] denotes the greatest integer less than or equal to x, is

Vishal Baghel

$l = \int_{1}^{3} [x^{2} - 2 x + 1 - 3] d x = \int_{1}^{3} [{(x - 1)}^{2} - 3] d x = \int_{1}^{3} [{(x - 1)}^{2}] d x - 3 \int_{1}^{3} d x$ ...........(A)

$l_{1} = \int_{1}^{3} [{(x - 1)}^{2}] d x P u t {(x - 1)}^{2} = t$

$l_{1} = \frac{1}{2} [0 \int_{0}^{1} \frac{d t}{\sqrt[]{t}} \int_{1}^{2} \frac{d t}{\sqrt[]{t}} + 2 \int_{2}^{3} \frac{d t}{\sqrt[]{t}} + 3 \int_{3}^{4} \frac{d t}{\sqrt[]{t}}] = \frac{1}{2} {{| \frac{t^{\frac{- 1}{2} + 1}}{- \frac{1}{2} + 1} |}_{1}^{2} {| + 2 \frac{t^{\frac{- 1}{2} + 1}}{- \frac{1}{2} + 1} |}_{2}^{3} {+ 3 \frac{t^{\frac{- 1}{2} + 1}}{- \frac{1}{2} + 1}]}_{3}^{4}}$

Hence from (A)

= $5 - \sqrt[]{2} - \sqrt[]{3} - \sqrt[]{3} - 6 = - 1 - \sqrt[]{2} - \sqrt[]{3}$

2^nd method

$\int_{1}^{3} [{(x - 1)}^{2}] d x - 6 . . . . . . . . . . . . . . (A)$

From (A), $l = 5 - \sqrt[]{2} - \sqrt[]{3} - 6 = - 1 - \sqrt[]{2} - \sqrt[]{3}$

Let f(x) be a differentiable function defined on [0, 2] such that f’(x) = f’(2 – x) for all $x \in (0, 2),$ f(0) = 1 and f(2) = e². Then the value of $\int_{0}^{2} f (x) d x i s$

Vishal Baghel

$l = \int_{0}^{2} f (x) d x = {[x f (x)]}_{0}^{2} - \int_{0}^{2} x f' (x) d x = 2 e^{2} - \int_{0}^{2} x f' (x) d x$ ........(A)

Put $l_{1} = \int_{0}^{2} x f' (x) d x$ .........(i)

Using properties $\int_{a}^{b} f (x) d x = \int_{a}^{b} f (a + b - x) d x$

$l_{1} = \int_{0}^{2} (2 - x) f' (2 - x) d x = \int_{0}^{2} (2 - x) f' (x) d x$ ...........(ii)

Adding (i) and (ii) we get

$2 l_{1} = 2 \int_{0}^{2} f' (x) d x \Rightarrow l_{1} = {[f (x)]}_{0}^{2}$

f(2) – f(0) = e² – 1

From (A) l = 2e² – e² + 1 = e² + 1

If I_m,n = $\int_{0}^{1} x^{m - 1} {(1 - x)}^{n - 1} d x, f o r m, n \geq 1, a n d \int_{0}^{1} \frac{x^{m - 1} + x^{n - 1}}{{(1 + x)}^{m + n}} d x = α I_{m, n, α \in R},$ then a equals…....

alok kumar singh

Given $l_{m, n} = \int_{0}^{1} x^{m - 1} {(1 - x)}^{n - 1} d x . . . . . . . . . . . . (i)$

put 1 - x = $t {\begin{cases} x = 0, t = 1 \\ x = 1, t = 0 \end{cases}$

dx = -dt

From (i) $l_{m, n} = \int_{1}^{0} {(1 - t)}^{m - 1} . t^{n - 1} (- d t)$

$l_{m, n} = \int_{0}^{1} t^{n - 1} {(1 - t)}^{m - 1} d t = \int_{0}^{1} x^{n - 1} {(1 - x)}^{m - 1} d x . . . . . . . . . . (i i)$

(i) $l_{m, n} = \int_{\infty}^{0} \frac{1}{{(1 + y)}^{m - 1}} {(1 - \frac{1}{1 + y})}^{n - 1} (\frac{- d y}{{(1 + y)}^{2}}) = \int_{0}^{\infty} \frac{y^{n - 1}}{{(1 + y)}^{m + n}} d y . . . . . . . . . . (i i i)$

Similarly by (ii) $l_{m, n} = \int_{0}^{\infty} \frac{y^{m - 1}}{{(y + 1)}^{m + n}} d y . . . . . . . . . . (i v)$

Adding (iii) & (iv) $2 l_{m, n} = \int_{0}^{\infty} \frac{y^{n - 1} + y^{m + 1}}{{(y + 1)}^{m + n}}$

Putting $\frac{1}{z} {\begin{cases} y = 1, z = 1 \\ y = \infty, z = 0 \end{cases}$ $\Rightarrow d y = \frac{- 1}{z^{2}} d z$

Hence $l_{m, n} = \int_{0}^{1} \frac{x^{m - 1} + x^{n - 1}}{{(1 + x)}^{m + n}}$ dx = a lm, n

-> a = 1

The value of the integral $\frac{48}{π^{4}} \int_{0}^{π} (\frac{3 π x^{2}}{2} - x^{3}) \frac{s i n x}{1 + c o s^{2} x} d x$ is equal to………..

Raj Pandey

$l = \frac{48}{π^{4}} \int_{0}^{π} [{(\frac{π}{2} - x)}^{3} - \frac{3 π^{2}}{4} (\frac{π}{2} - x) + \frac{π^{3}}{4}] \frac{s i n x d x}{1 + c o s^{2} x}$

Using $\int_{a}^{b} f (x) d x = \int_{a}^{b} f (a + b - x) d x$

we get $l = \frac{48}{π^{4}} \int_{0}^{π} [- {(\frac{π}{2} - x)}^{3} + \frac{3 π^{2}}{4} (\frac{π}{2} - x) + \frac{π^{3}}{4}] \frac{s i n x d x}{1 + c o s^{2} x}$

Adding these two equations, we get

$\Rightarrow l = \frac{12}{π} {[- t a n^{- 1} (c o s x)]}_{0}^{π} = \frac{12}{π} . \frac{π}{2} = 6$

Get authentic answers from experts, students and alumni that you won't find anywhere else

On Shiksha, get access to

65k Colleges
1.2k Exams
682k Reviews
1800k Answers

Community GuidelinesUser Points System

QuestionsDiscussionsTags

Let P(x) = x² + bx + c be a quadratic polynomial with real coefficients such that ∫₀¹ P(x)dx = 1 and P(x) leaves remainder 5 when it is divided by (x - 2). Then the value of 9(b + c) is equal to:

1 Answer

Similar Questions for you

Learn more about...

Most viewed information

Share Your College Life Experience

Didn't find the answer you were looking for?

Need guidance on career and education? Ask our experts

Your Question