Let f and g be increasing and decreasing functions, respectively from [0 , ) to [0 , ). Let h (x) = f [g (x)] . If h (0) = 0, then h (x) - h (1) is

Let f and g be increasing and decreasing functions, respectively …

MCQ

Let $f$ and $g$ be increasing and decreasing functions, respectively from $[0 , \infty )$ to $[0 , \infty )$. Let $h (x) = f [g (x)]$ . If $h (0) = 0$, then $ h (x) - h (1)$ is

✓
always zero
B
strictly increasing
C
always negative
D
always positive

✓

Answer

Correct option: A.

always zero

a
$x \geqslant y \geqslant 0$

$g(y) \geqslant g(x)$

$f(g(y)) \geqslant f(g(x)) \quad \forall x \in[0, \infty)$

$h(y) \geqslant h(x) \quad \forall \quad x \geqslant y$

$h(x)$ is a decressing $f^{n} \quad \forall x \in[0, \infty)$

$\forall \quad x \geqslant 0$

$k_{t}(0) \geqslant h(x)$

$n(x) \leq 0 \quad \forall x \geqslant 0$

$h(x) \geqslant 0 \quad \forall \quad x \geqslant 0$

$h(x)=0$

$h(x)-h(1)$

$0-0$

$=0$

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STD 12 - 6. Application of derivatives — Mathematics STD 12 Science — Question

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