1
JEE Main 2020 (Online) 7th January Evening Slot
Numerical
+4
-0
If the foot of the perpendicular drawn from the point (1, 0, 3) on a line passing through ($$\alpha $$, 7, 1)
is
$$\left( {{5 \over 3},{7 \over 3},{{17} \over 3}} \right)$$, then $$\alpha $$ is equal to______.
Your input ____
2
JEE Main 2020 (Online) 7th January Evening Slot
Numerical
+4
-0
If the system of linear equations,
x + y + z = 6
x + 2y + 3z = 10
3x + 2y + $$\lambda $$z = $$\mu $$
has more than two solutions, then $$\mu $$ - $$\lambda $$2 is equal to ______.
x + y + z = 6
x + 2y + 3z = 10
3x + 2y + $$\lambda $$z = $$\mu $$
has more than two solutions, then $$\mu $$ - $$\lambda $$2 is equal to ______.
Your input ____
3
JEE Main 2020 (Online) 7th January Evening Slot
Numerical
+4
-0
If the mean and variance of eight numbers 3, 7, 9, 12, 13, 20, x and y be 10 and 25 respectively,
then x.y is equal to _______.
Your input ____
4
JEE Main 2020 (Online) 7th January Evening Slot
Numerical
+4
-0
If the function ƒ defined on $$\left( { - {1 \over 3},{1 \over 3}} \right)$$ by
f(x) = $$\left\{ {\matrix{ {{1 \over x}{{\log }_e}\left( {{{1 + 3x} \over {1 - 2x}}} \right),} & {when\,x \ne 0} \cr {k,} & {when\,x = 0} \cr } } \right.$$
is continuous, then k is equal to_______.
f(x) = $$\left\{ {\matrix{ {{1 \over x}{{\log }_e}\left( {{{1 + 3x} \over {1 - 2x}}} \right),} & {when\,x \ne 0} \cr {k,} & {when\,x = 0} \cr } } \right.$$
is continuous, then k is equal to_______.
Your input ____
Paper analysis
Total Questions
Chemistry
25
Mathematics
25
Physics
25
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