1
GATE ME 2014 Set 2
MCQ (Single Correct Answer)
+1
-0.3
Curl of vector $$\,\,\overrightarrow F = {x^2}{z^2}\widehat i - 2x{y^2}z\widehat j + 2{y^2}{z^3}\widehat k\,\,$$ is
A
$$\left( {4y{z^3} + 2x{y^2}} \right)\widehat i + 2{x^2}z\widehat j - 2{y^2}z\widehat k$$
B
$$\,\left( {4y{z^3} + 2x{y^2}} \right)\widehat i - 2{x^2}z\widehat j - 2{y^2}z\widehat k$$
C
$$2x{z^2}\widehat i - 4xyz\widehat j + 6{y^2}{z^2}\widehat k$$
D
$$2x{z^2}\widehat i + 4xyz\widehat j + 6{y^2}{z^2}\widehat k$$
2
GATE ME 2014 Set 2
MCQ (Single Correct Answer)
+2
-0.6
A box contains $$25$$ parts of which $$10$$ are defective. Two parts are being drawn simultaneously in a random manner from the box. The probability of both the parts being good is
A
$${7 \over {20}}$$
B
$${42 \over {125}}$$
C
$${25 \over {29}}$$
D
$${5 \over {9}}$$
3
GATE ME 2014 Set 2
Numerical
+2
-0
Consider an unbiased cubic die with opposite faces coloured identically and each face coloured red, blue or green such that each color appears only two times on the die. If the die is thrown thrice, the probability of obtaining red colour on top face of the die at least twice is ________.
Your input ____
4
GATE ME 2014 Set 2
MCQ (Single Correct Answer)
+2
-0.6
The general solution of the differential equation $$\,\,{{dy} \over {dx}} = \cos \left( {x + y} \right),\,\,$$ with $$c$$ as a constant, is
A
$$y + \sin \left( {x + y} \right) = x + c$$
B
$$\tan \left( {{{x + y} \over 2}} \right) = y + c$$
C
$$\cos \left( {{{x + y} \over 2}} \right) = x + c$$
D
$$\tan \left( {{{x + y} \over 2}} \right) = x + c$$
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