1
BITSAT 2020
MCQ (Single Correct Answer)
+3
-1

Given that $$f(x) = 2{x^3} + {x^4} + \log x$$ and assuming g to be the inverse function of f, compute the value of g'(3).

A
$${1 \over 9}$$
B
$${1 \over 7}$$
C
$${1 \over 11}$$
D
$${1 \over 8}$$
2
BITSAT 2020
MCQ (Single Correct Answer)
+3
-1

A line passing through P(3, 7, 1) and R(2, 5, 7) meet the plane 3x + 2y + 11z $$-$$ 9 = 0 at Q. Then PQ is equal to

A
$${{5\sqrt {41} } \over {59}}$$
B
$${{\sqrt {41} } \over {59}}$$
C
$${{50\sqrt {41} } \over {59}}$$
D
$${{25\sqrt {41} } \over {59}}$$
3
BITSAT 2020
MCQ (Single Correct Answer)
+3
-1
$$\int {{{8{x^{43}} + 13{x^{38}}} \over {{{({x^{13}} + {x^5} + 1)}^4}}}dx} $$ equals to
A
$${{{x^{39}}} \over {3{{({x^{13}} + {x^5} + 1)}^3}}} + C$$
B
$${{{x^{39}}} \over {{{({x^{13}} + {x^5} + 1)}^3}}} + C$$
C
$${{{x^{39}}} \over {5{{({x^{13}} + {x^5} + 1)}^3}}} + C$$
D
None of these
4
BITSAT 2020
MCQ (Single Correct Answer)
+3
-1

If $$a = - \widehat i + \widehat j + \widehat k$$ and $$b = 2\widehat i + \widehat k$$, then find z component of a vector r, which is coplanar with a and b, r . b = 0 and r . a = 7.

A
0
B
3
C
6
D
5/2
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