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Higher Order Derivatives

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Question

Answer the following by appropriately matching the lists based on the information in Column I and Column II
$\begin{matrix} C o l u m n I & C o l u m n I I a . y = f (x) is given by x = t^{5} - 5 t^{3} - 20 t + 7 and y = 4 t^{3} - 3 t^{2} - 18 t + 3. Then - 5 \times \frac{d y}{d x} at t = 1 & p. 0 b . Let P (x) be a polynomial of degree 4, with P (2) = - 1, P^{'} (2) = 0, P^{''} (2) = 2, P^{'''} (2) = - 12 and P^{i v} (2) = 24, then P^{''} (3) is & q. - 2 c . y = \frac{1}{x}, then \frac{\frac{d y}{\sqrt{1 + y^{4}}}}{\frac{d x}{\sqrt{1 + x^{4}}}} & r . 2 d . f (\frac{2 x + 3 y}{5}) = \frac{2 f (x) + 3 f (y)}{5} and f^{'} (0) = p and f (0) = q . Then, f^{''} (0) is & s. - 1 \end{matrix}$

A

a \to p, b \to r, c \to s, d \to q

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B

a \to q, b \to r, c \to s, d \to p

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C

a \to q, b \to s, c \to r, d \to p

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D

a \to q, b \to r, c \to p, d \to s

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Solution

The correct option is B $a \to q, b \to r, c \to s, d \to p$
a.
$\frac{d y}{d x} = \frac{d y / d t}{d x / d t} = \frac{12 t^{2} - 6 t - 18}{5 t^{4} - 15 t^{2} - 20}$
Putting $t = 1$
$\Rightarrow \frac{d y}{d x} = \frac{12 - 6 - 18}{5 - 15 - 20} = \frac{2}{5} \Rightarrow - 5 \times \frac{d y}{d x} = - 2$
$a \to q$

b.
$P (x) = a (x - 2)^{4} + b (x - 2)^{3} + c (x - 2)^{2} + d (x - 2) + e$
Given
$P (2) = - 1 \Rightarrow e = - 1$
$P^{'} (2) = 0 \Rightarrow d = 0 P^{''} (2) = 2 \Rightarrow 2 c = 2 \Rightarrow c = 1 P^{'''} (2) = - 12 \Rightarrow 6 b = - 12 \Rightarrow b = - 2 P^{i v} (2) = 24 \Rightarrow 24 a = 24 \Rightarrow a = 1$
So,
$P^{''} (x) = 12 a (x - 2)^{2} + 6 b (x - 2) + 2 c \Rightarrow P^{''} (x) = 12 (x - 2)^{2} - 12 (x - 2) + 2 \Rightarrow P^{''} (3) = 12 - 12 + 2 = 2$
$b \to r$

c.
$\sqrt{1 + y^{4}} = \sqrt{1 + \frac{1}{x^{4}}} [∵ y = \frac{1}{x}]$
$\Rightarrow \sqrt{1 + y^{4}} = \frac{\sqrt{1 + x^{4}}}{x^{2}} \Rightarrow \frac{\sqrt{1 + y^{4}}}{\sqrt{1 + x^{4}}} = \frac{1}{x^{2}} \dots (1)$
Now,
$y = \frac{1}{x} \Rightarrow \frac{d y}{d x} = \frac{- 1}{x^{2}}$
Using equation (1),
$\Rightarrow \frac{d y}{d x} = - \frac{\sqrt{1 + y^{4}}}{\sqrt{1 + x^{4}}} \Rightarrow \frac{\frac{d y}{\sqrt{1 + y^{4}}}}{\frac{d x}{\sqrt{1 + x^{4}}}} = - 1$
$c \to s$

d.
Obviously, $f (x)$ is a linear function,
Also $f^{'} (0) = p, f (0) = q$
$f (x) = p x + q \Rightarrow f^{''} (x) = 0$
$d \to p$

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