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Maths Probability

Refer to Question 41 above. If a white ball is selected, what is the probability that it came from

$i.$ $B a g I I$

$ii. B a g I I I$

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alok kumar singh

Contributor-Level 10

This is a Long Answer Type Questions as classified in NCERT Exemplar

Sol:

$\begin{array}{l} Referring t o E x e r c i s e Q . 41, w e w i l l u s e h e r e, B a y e s' T h e o r e m \\ (i) P (E_{2} / F) = \frac{P (E_{2}) . P (F / E_{2})}{P (E_{1}) . P (F / E_{1}) + P (E_{2}) . P (F / E_{2}) + P (E_{3}) . P (F / E_{3})} \\ = \frac{\frac{2}{6} . \frac{1}{3}}{\frac{1}{6} . 0 + \frac{2}{6} . \frac{1}{3} + \frac{3}{6} . 1} = \frac{\frac{2}{18}}{\frac{2}{18} + \frac{3}{6}} = \frac{2}{18} * \frac{18}{11} = \frac{2}{11} \\ (i i) P (E_{3} / F) = \frac{P (E_{3}) . P (F / E_{3})}{P (E_{1}) . P (F / E_{1}) + P (E_{2}) . P (F / E_{2}) + P (E_{3}) . P (F / E_{3})} \\ = \frac{\frac{3}{6} . 1}{\frac{1}{6} . 0 + \frac{2}{6} . \frac{1}{3} + \frac{3}{6} . 1} = \frac{\frac{3}{6}}{\frac{2}{18} + \frac{3}{6}} = \frac{3}{6} * \frac{18}{11} = \frac{9}{11} \\ H e n c e, t h e r e q u i r e d p r o b a b i l i t i e s a r e \frac{2}{11} a n d \frac{9}{11} \end{array}$

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New answer posted

5 months ago

Maths Probability

Three bags contain a number of red and white balls as follows:

Bag 1: 3 red balls, Bag 2: 2 red balls and 1 white ball, Bag 3: 3 white balls. The probability that bag $i$ will be chosen and a ball is selected from it is $\frac{i}{6}$ , where $i = 1, 2, 3$ . What is the probability that:

i. A red ball will be selected?

ii. A white ball is selected?

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alok kumar singh

Contributor-Level 10

This is a Long Answer Type Questions as classified in NCERT Exemplar

Sol:

$\begin{array}{l} G i v e n t h a t : \\ ? ? ? B a g I = 3 r e d b a l l s a n d n o w h i t e b a l l \\ B a g I I = 2 r e d b a l l s a n d 1 w h i t e b a l l \\ B a g I I I = n o r e d b a l l a n d 3 w h i t e b a l l s \\ L e t E_{1}, E_{2} a n d E_{3} b e t h e e v e n t s o f B a g I I, a n d B a g I I I r e s p e c t i v e l y a n d a b a l l i s \\ d r a w n f r o m i t . \\ ∴ P (E_{1}) = \frac{1}{6}, P (E_{2}) = \frac{2}{6} a n d P (E_{3}) = \frac{3}{6} \\ (i) L e t E b e t h e e v e n t t h a t r e d b a l l i s s e l e c t e d \\ ∴ P (E) = P (E_{1}) . P (E / E_{1}) + P (E_{2}) . P (E / E_{2}) + P (E_{3}) . P (E / E_{3}) \\ = \frac{1}{6} . \frac{3}{3} + \frac{2}{6} . \frac{2}{3} + \frac{3}{6} . 0 = \frac{3}{18} + \frac{4}{18} = \frac{7}{18} \\ (i i) L e t F b e t h e e v e n t t h a t w h i t e b a l l i s s e l e c t e d \\ ∴ P (F) = 1 - P (E) [P (E) + P (F) = 1] \\ = 1 - \frac{7}{18} = \frac{11}{18} \\ H e n c e, t h e r e q u i r e d p r o b a b i l i t i e s a r e \frac{7}{18} a n d \frac{11}{18} . \end{array}$

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New answer posted

5 months ago

Maths Maths Integrals

271. The value of $\int_{0}^{1} t a n^{- 1} (\frac{2 x - 1}{1 + x - x^{2}}) d x$ is

A.1

B. 0

C.-1

D. $\frac{π}{4}$

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Vishal Baghel

Contributor-Level 10

Consider, $I = \int_{0}^{1} t a n^{- 1} (\frac{2 x - 1}{1 + x - x^{2}}) d x$

$\begin{array}{l} \Rightarrow I = \int_{0}^{1} t a n^{- 1} (\frac{x - (1 - x)}{1 + x (1 - x)}) d x \\ \Rightarrow I = \int_{0}^{1} [t a n^{- 1} x - t a n^{- 1} (1 - x)] d x - - - - - (1) \\ \Rightarrow I = \int_{0}^{1} [t a n^{- 1} (1 - x) - t a n^{- 1} (1 - 1 + x)] d x \\ \Rightarrow I = \int_{0}^{1} [t a n^{- 1} (1 - x) - t a n^{- 1} x] d x \\ \Rightarrow I = \int_{0}^{1} [t a n^{- 1} (1 - x) - t a n^{- 1} (x)] d x - - - - - (2) \end{array}$

Adding (1) and (2), we get

$\begin{array}{l} \Rightarrow 2 I = \int_{0}^{1} [t a n^{- 1} x - t a n^{- 1} (1 - x) - t a n^{- 1} (1 - x) - t a n^{- 1} x] d x \\ \Rightarrow 2 I = 0 \\ \Rightarrow I = 0 \end{array}$

Thus, the correct option is B.

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New answer posted

5 months ago

Maths Integrals

270. If $f (a + b - x) = f (x), t h e n, \int_{a}^{b} x f (x)$ is Equal to

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Vishal Baghel

Contributor-Level 10

Giver, f(a + bx) = f(x). _________ (1)

Let I $= \int_{a}^{b} x + (x) = \int_{a}^{b} (a + b - x) f (a + b - x) d x_____(2)$

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

$= \int_{a}^{b} (a + b - x) f (x) d x .$ ___________ (3) {because Equation (1)}

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

$\Rightarrow 2I = \int_{a}^{b} (a + b - x + x) \overset{}{f} (x) d x$

$\Rightarrow 2I = \int_{a}^{b} (a + b) f (x) d x$

$\Rightarrow = \frac{a + b}{2} \int_{a}^{b} f (x) d x .$

therefore, Option D is correct.

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New answer posted

5 months ago

Maths Maths Integrals

269. $\int \frac{c o s 2 x d x}{{(s i n x + c o s x)}^{2}}$ is Equal to

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Vishal Baghel

Contributor-Level 10

Let $= \int \frac{c o s 2 x d x}{{(s i n x + c o s x)}^{2}}$

$= \int \frac{c o s^{2} x - s i n^{2} x}{{(s i n x + c o s x)}^{2}} d x {? c o s 2 x = c o s^{2} x - s i n^{2} x$

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

$= \int \frac{(c o s x - s i n x)}{s i n x + c o s x .} d x$

$= l o g | s i n x + c o s x | + c {\int \frac{f^{'} (x)}{f (x)} d x = l o g | f (x) | + c$

So, option B is correct.

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New answer posted

5 months ago

Maths Maths Integrals

268. $\int \frac{d x}{e^{x} + e^{- x}}$ is Equal to

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Vishal Baghel

Contributor-Level 10

Let $= \int \frac{d x}{e^{x} + e^{- x}}$

$= \int \frac{d x}{e^{x} + \frac{1}{e^{x} .}} = \int \frac{e^{x} d x}{e^{x} \cdot e^{x} + 1}$

$= \int \frac{e^{x} d x}{e^{2 x} + 1}$

Putting e^x = t

e^xdx = dt.

$∴ = \int \frac{d t}{t^{2} + 1 .}$

= tan^{- 1} t + c

= tan^{- 1} (e^x) + c

therefore, Option A is correct.

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New answer posted

5 months ago

Maths Maths Integrals

267. Evaluate $\int_{0}^{1} e^{2 - 3 x} d x$ as a limit of a sum.

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Vishal Baghel

Contributor-Level 10

Let $I = \int_{0}^{1} e^{2 - 3 x} d x$

We know that,

$\int_{a}^{b} f (x) d x = (b - a) \underset{n \to \infty}{l i m} \frac{1}{n} [f (a) + f (a + h) + . . . + f (a (n - 1) h)]$

Where, $h = \frac{b - a}{n}$

Here, $a = 0, b = 1$ and $f (x) e^{2 - 3 x}$

$\Rightarrow h = \frac{1 - 0}{n} = \frac{1}{n}$

$∴ \int_{0}^{1} e^{2 - 3 x} d x = (1 - 0) \underset{n \to \infty}{l i m} \frac{1}{n} [f (0) + f (0 + h) + . . . + f (0 + (n - 1) h)]$

$\begin{array}{l} = \underset{n \to \infty}{l i m} \frac{1}{n} [e^{2} + e^{2 - 3 x} + . . . + e^{2 - 3 (n - 1) h}] = \underset{n \to \infty}{l i m} \frac{1}{n} [e^{2} {1 + e^{- 3 h} + e^{- 6 h} + e^{- 9 h} + . . . + e^{- 3 (n - 1) h}}] \\ = \underset{n \to \infty}{l i m} \frac{1}{n} [e^{2} {\frac{1 - {(e^{- 3 h})}^{n}}{1 - (e^{- 3 h})}}] = \underset{n \to \infty}{l i m} \frac{1}{n} [e^{2} {\frac{1 - e^{\frac{- 3}{n} n}}{1 - e^{\frac{- 3}{n}}}}] \\ = \underset{n \to \infty}{l i m} \frac{1}{n} [\frac{e^{2} (1 - e^{- 3})}{1 - e^{\frac{- 3}{n}}}] = e^{2} (e^{- 3} - 1) \underset{n \to \infty}{l i m} \frac{1}{n} [\frac{1}{e^{\frac{- 3}{n}} - 1}] \\ = \underset{n \to \infty}{l i m} \frac{1}{n} [\frac{e^{2} (1 - e^{- 3})}{1 - e^{\frac{- 3}{n}}}] = e^{2} (e^{- 3} - 1) \underset{n \to \infty}{l i m} \frac{1}{n} [\frac{1}{e^{\frac{- 3}{n}} - 1}] \end{array}$

$\begin{array}{l} = e^{2} (e^{- 3} - 1) \underset{n \to \infty}{l i m} (- \frac{1}{3}) [\frac{- \frac{3}{n}}{e^{\frac{- 3}{n}} - 1}] = \frac{e^{2} (e^{- 3} - 1)}{3} \underset{n \to \infty}{l i m} [\frac{- \frac{3}{n}}{e^{\frac{- 3}{n}} - 1}] \\ = \frac{- e^{2} (e^{- 3} - 1)}{3} (1) \\ = \frac{- e^{- 1} + e^{2}}{3} \\ = \frac{1}{3} (e^{2} - \frac{1}{e}) \end{array}$

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New answer posted

5 months ago

Maths Maths Integrals

266. $\int_{0}^{1} s i n^{- 1} x d x . = \frac{π}{2} - 1$

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Vishal Baghel

Contributor-Level 10

Kindly go through the solution

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New answer posted

5 months ago

Maths Maths Integrals

265. $\int_{0}^{\frac{π}{4}} \cdot 2 t a n^{3} x d x = 1 - l o g 2$

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Vishal Baghel

Contributor-Level 10

Let I $\int_{0}^{\frac{π}{4}} \cdot 2 t a n^{3} x d x$

$= 2 \int_{0}^{\frac{π}{4}} t a n^{2} x t a n x d x$

$= 2 \int_{0}^{\frac{π}{4}} (s e c^{2} x - 1) t a n x d x {? s e c^{2} x = t a n^{2} x + 1}$

$= 2 \int_{0}^{\frac{π}{4}} s e c^{2} x t a n x d x - 2 \int_{0}^{\frac{π}{4}} t a n x d x$

$= 2I_{1} + 2 [l o g] {(c o s x)}_{0}^{\frac{π}{4}}$

$= 2I_{1} + 2 [l o g (c o s \frac{π}{4}) - l o g (c o s 0)]$

$= 2I_{1} + 2 (l o g1/√2$
$\frac{}{} - l o g 1)$

$= 2I_{1} + 2 (l o g \cdot 2^{\frac{- 1}{2}} - 0)$

$I = 2I_{1} + 2 * (\frac{- 1}{2}) l o g 2 = 2I_{1} - l o g 2 .____(1) .$

Where I $_{1} = \int_{0}^{\frac{π}{4}} s e c^{2} x t a n x d x$

Let tan x = t =>sec²xdx = dt

When, x = 0, t = tan 0. = 0

$x = \frac{π}{4}, t = t a n \frac{π}{4} = 1$

$_{1} = \int_{0}^{1} t d t = {[\frac{t^{2}}{2}]}_{0}^{1} = \frac{1}{2} - 0 = \frac{1}{2}$

So, Equation (1) becomes,

$= 2 * \frac{1}{2} - l o g 2$

=1 - log 2.

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New answer posted

5 months ago

Maths Maths Integrals

264. $\int_{0}^{\frac{π}{2}} s i n^{3} x d x . = \frac{2}{3}$

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Vishal Baghel

Contributor-Level 10

LHS = I $= \int_{0}^{\frac{π}{2}} s i n^{3} x d x . {s i n 3A = 3 s i nA - 4 s i n^{3 A}$

$= \int_{0}^{\frac{π}{2}} \frac{1}{4} (3 s i n x - s i n 3 x) d x . s i n^{3A} = \frac{1}{4} (3 s i nA - s i n 3A)$

$= \frac{1}{4} [3 \int_{0}^{\frac{π}{2}} s i n x d x - \int_{0}^{\frac{π}{q}} s i n 3 x d x]$

$= \frac{1}{4} {3 {[- c o s x]}_{0}^{\frac{π}{2}} - {[\frac{- c o s 3 x}{3}]}_{0}^{\frac{π}{2}}}$

$= \frac{3}{4} (- c o s \frac{π}{2} + c o s 0) - \frac{1}{12} (- c o s \frac{3 π}{2} + c o s 3 * 0)$

$= \frac{3}{4} (- 0 + 1) - \frac{1}{12} (- 0 + 1)$

$= \frac{3}{4} - \frac{1}{12} = \frac{9 - 1}{12} = \frac{8}{12} = \frac{2}{3}$

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