1
GATE CE 2014 Set 2
Numerical
+2
-0
An observer counts $$240$$veh/h at a specific highway location. Assume that the vehicle arrival at the location is Poisson distributed, the probability of having one vehicle arriving over a $$30$$-second time interval is _______.
Your input ____
2
GATE CE 2014 Set 2
MCQ (Single Correct Answer)
+1
-0.3
A fair (unbiased) coin was tossed four times in succession and resulted in the following outcomes; (i) Head, (ii) Head, (III) Head, (iv) Head. The probability of obtaining a ''Tail'' when the coin is tossed again is
A
$$0$$
B
$${1 \over 2}$$
C
$${4 \over 5}$$
D
$${1 \over 5}$$
3
GATE CE 2014 Set 2
MCQ (Single Correct Answer)
+2
-0.6
If $$\left\{ x \right\}$$ is a continuous, real valued random variable defined over the interval $$\left( { - \infty ,\,\, \pm \infty } \right)$$ and its occurrence is defined by the density function given as: $$f\left( x \right) = {1 \over {\sqrt {2\pi * b} }}{e^{ - {1 \over 2}{{\left( {{{x - a} \over b}} \right)}^2}}}$$ where $$'a'$$ and $$'b'$$ are the statistical attributes of the random variable $$\left\{ x \right\}$$. The value of the integral $$\int\limits_{ - \infty }^a {{1 \over {\sqrt {2\pi * b} }}{e^{ - {1 \over 2}{{\left( {{{x - a} \over b}} \right)}^2}}}} dx\,\,\,$$ is
A
$$1$$
B
$$0.5$$
C
$$\pi $$
D
$${\pi \over 2}$$
4
GATE CE 2014 Set 2
MCQ (Single Correct Answer)
+1
-0.3
The integrating factor for the differential equation $${{dP} \over {dt}} + {k_2}\,P = {k_1}{L_0}{e^{ - {k_1}t}}\,\,$$ is
A
$${e^{ - {k_1}t}}\,$$
B
$${e^{ - {k_2}t}}\,$$
C
$${e^{ {k_1}t}}\,$$
D
$${e^{ {k_2}t}}\,$$
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