Solution

According to the given condition, 

SOLUTION

SOLUTION

Solution

Let $$A$$ be the event that face 1 turns up
$$ B$$ be the event that face 2 turns up.
Then $$\displaystyle P\left ( A \right )= 0.10$$ and $$\displaystyle P\left ( B \right )= 0.32,$$
Since A, B are mutually exclusive, we have
$$\displaystyle P\left ( A\cup B \right )= P\left ( A \right )+P\left ( B \right )= 0.10+0.32= 0.42.$$
We are to find $$\displaystyle P\left ( A|A\cup B \right )$$
But $$\displaystyle P\left ( A|A\cup B \right )= \frac{P\left [ A\cap \left ( A\cup B \right ) \right ]}{P\left ( A\cup B \right )}$$

$$= \dfrac{P\left ( A \right )}{P\left ( A\cup B \right )}$$

Hence $$\displaystyle P\left ( A|A\cup B \right )= \frac{0.10}{0.42}= \frac{5}{21}$$

Solution

The husband tells lie in $$30\%  = 0.3$$ cases.

The wife tells lie in $$35\%  = 0.35$$ cases.

The probability that they both will contradict is,

$$P = P\left( {{\rm{husband}}\;{\rm{lies}}\;{\rm{but}}\;{\rm{wife}}\;{\rm{don't}}} \right) + P\left( {{\rm{wife}}\;{\rm{lies}}\;{\rm{but}}\;{\rm{husband}}\;{\rm{don't}}} \right)$$

$$ = 0.3\left( {1 - 0.35} \right) + \left( {0.35} \right)\left( {1 - 0.3} \right)$$

$$ = 0.195 + 0.245$$

$$ = 0.44$$

$$ = 44\% $$

SOLUTION

Solution 

\( <p>f (x) = sin ^-1 \(\left[ {{x}^{2}}+\cfrac{1}{2} \right]+\)cos ^-1\(\left[ {{x}^{2}}-\cfrac{1}{2} \right]\)<br /> &nbsp;</p> <p>= sin ^-1 \(\left[ {{x}^{2}}+\cfrac{1}{2} \right]+\) cos ^-1 \(\left[ {{x}^{2}}+\cfrac{1}{2}-1 \right]\)<br /> &nbsp;</p> <p>= sin ^-1 \(\left[ {{x}^{2}}+\cfrac{1}{2} \right]+\) cos ^-1 \(\left( \left[ {{x}^{2}}+\cfrac{1}{2} \right]-1 \right)\)<br /> &nbsp;</p> <p>Since \({{x}^{2}}+\cfrac{1}{2}\) \(\ge \cfrac{1}{2}\), \(\left[ {{x}^{2}}+\cfrac{1}{2} \right]\) = 0 or 1 as<br /> Sin ^-1\(\left[ {{x}^{2}}+\cfrac{1}{2} \right]\) is defined only for these two values<br /> &nbsp;</p> <p>Hence \(\left[ {{x}^{2}}+\cfrac{1}{2} \right]=\) 0<br /> &nbsp;</p> <p>&rArr;f (x) = sin ^-1 0 + cos ^-1 ( - 1) = \(\pi \left[ {{x}^{2}}+\cfrac{1}{2} \right]=\) 1<br /> &rArr; f (x) = sin -1 (1) + cos -10 = &pi;</p> <p>Therefore range of f (x) = {\(\pi \)}</p>\)

SOLUTION

Solution

Let $$A$$ denote the event that the runner succeeds exactly $$3$$ times out of five and $$B$$ denote the event that the number succeeds on the first trial.
$$\displaystyle P(B|A)=\frac {P(B\cap A)}{P(A)}$$
But $$P(B\cap A)=P$$ (succeeding in the first trial and exactly once in two other trials)
$$=p(^4C_2p^2(1-p)^2)=6p^3(1-p)^2$$
and $$P(A)=^5C_3p^3(1-p)^2=10p^3(1-p)^2$$
Thus, $$\displaystyle P(B|A)=\frac {6p^3(1-p)^2}{10p^3(1-p)^2}=\frac {3}{5}$$.

SOLUTION

Given, f(x)=sin(x+a)

and g(x)=bsinx+ccosx
f(0)=g(0)⇒sina=c
f′(x)=cos(x+a)
g′(x)=bcosx−csinx
f′(0)=g′(0)⇒cosa=b