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Relations and Functions

Multiple Choice Questions

91.

$\{x \in R : \frac{14 x}{x + 1} - \frac{9 x - 30}{x - 4} < 0 = ?\}$

(- 1, 4)
$(1, 4) \cup ((5, 7))$
(1, 7)
$(- 1, 1) \cup (4, 6)$

92.

If a, b and n are natural numbers, then a^{2n - 1} + b^{2n - 1} is divisible by

a + b
a - b
a³ + b³
a² + b²

93.

$Let f : R \to R be defined by f (x) = \{α + \frac{\sin (x)}{x}, if x > 0 2, if x = 0 β + [\frac{\sin (x) - x}{x^{3}}], if x < 0\} where, [x] denotes the integral part of x . If f continuous at x = 0, then β - α is equal to$

94.

$If f (x) = {(p - x^{n})}^{\frac{1}{n}}, p > 0 and n is a positive integer, then f [f (x)] = ?$

x
xⁿ
p^1/n
p - xⁿ

95.
Let Q be the set of all rational numbers in [0, 1]and f: [0, 1] $\to$ [0,1] be defined by
$f (x) = \{x, for x \in Q 1 - x for x \notin Q\} Then, the set S = \{x \in [0, 21] : (fof) (x)\} = ?$

$[0, 1]$

- Q

$[0, 1] - Q$

(0, 1)

$[0, 1]$

$Given, f (x) = \{x for x \in Q 1 - x for x \notin Q\} is defined for f [0, 1] \to [0, 1] If x is rational, then f (x) = x ∴ f (f (x)) = f (x) = x If x is irrational, then f (x) = 1 - x ∴ fof (x) = f (1 - x) = 1 - (1 - x) = x ∴ fof (x) = x is possible for all values of domain [0, 1]$

96.

$If f : R \to R, g : R \to R are defined by f (x) = 5 x - 3, g (x) = x^{2} + 3, then {gof}^{- 1} (3) = ?$

$\frac{25}{3}$
$\frac{111}{25}$
$\frac{9}{25}$
$\frac{25}{111}$

97.

$If A = \{x \in Rl \frac{π}{4} \leq x \leq \frac{π}{3}\} and f (x) = \sin (x) - x, then f (A) = ?$

$[\frac{\sqrt{3}}{2} - \frac{π}{3}, \frac{1}{\sqrt{2}} - \frac{π}{4}]$
$[\frac{- 1}{\sqrt{2}} - \frac{π}{4}, \frac{\sqrt{3}}{2} - \frac{π}{3}]$
$(- \frac{π}{3}, - \frac{π}{4})$
$[\frac{π}{4}, \frac{π}{3}]$

98.

$In a ∆ ABC, \frac{a}{\tan (A)} + \frac{b}{\tan (B)} + \frac{c}{\tan (C)} = ?$

2r
r +2R
2r +R
2(r + R)

99.

If f is defined in [1, 3] by f(x) = x³ + bx² + ax,such that f(1) - f(3) = 0 and f'(c) = 0, where c = 2 + $\frac{1}{\sqrt{3}}$ , then (a, b) is equal to

( - 6, 11)
$(2 - \frac{1}{\sqrt{3}}, 2 + \frac{1}{\sqrt{3}})$
(11, - 6)
(6, 11)

100.

The domain of the function f(x) = $\sqrt{\log_{0.5} (x!)} is$

$\{0, 1, 2, 3, . . .\}$
$\{0, 1, 2, 3, . . .\}$
$(0, \infty)$
$\{0, 1\}$

Previous Year Papers

Test Series

Test Yourself

Multiple Choice Questions

95. Let Q be the set of all rational numbers in [0, 1]and f: [0, 1] → [0,1] be defined byf(x) = x, for x ∈ Q1 - x for x∉ QThen, the set S = x ∈ 0, 21 : fofx = ? [0, 1] - Q [0, 1] - Q (0, 1)

95.
Let Q be the set of all rational numbers in [0, 1]and f: [0, 1] $\to$ [0,1] be defined by
$f (x) = \{x, for x \in Q 1 - x for x \notin Q\} Then, the set S = \{x \in [0, 21] : (fof) (x)\} = ?$

$[0, 1]$

- Q

$[0, 1] - Q$

(0, 1)