Solved papers for JEE Main & Advanced JEE Main Paper (Held On 22 April 2013)

JEE Main Paper (Held On 22 April 2013) Total Questions - 30

1) The number of ways in which an examiner can assign 30 marks to 8 question, giving not less than 2 marks to any question, is: JEE Main Online Paper (Held On 22 April 2013)

A)

\[^{30}{{C}_{7}}\]

B)

\[^{21}{{C}_{8}}\]

C)

\[^{21}{{C}_{7}}\]

D)

\[^{30}{{C}_{8}}\]

View Answer
2) If the system of linear equations \[{{x}_{1}}+2{{x}_{2}}+3{{x}_{3}}=6\] \[{{x}_{1}}+3{{x}_{2}}+5{{x}_{3}}=9\] \[2{{x}_{1}}+5{{x}_{2}}+a{{x}_{3}}=b\] is consistent and has infinite number of solutions, then: JEE Main Online Paper (Held On 22 April 2013)

A)

\[a=8,b\] can be any real number

B)

\[b=15,\]a cab be any real number

C)

\[a=R-\{8\}\] and \[\operatorname{b}\in \operatorname{R}-[15]\]

D)

\[\operatorname{a}=8,b=15\]

View Answer
3) Given sum of the first n terms of an A.P. is \[2n+3{{n}^{2}}\]. Anther A.P. is formed with the same first term and double of the common difference, the sum of n terms of the new A.P. is : JEE Main Online Paper (Held On 22 April 2013)

A)

\[n+4{{n}^{2}}\]

B)

\[6{{n}^{2}}-n\]

C)

\[{{n}^{2}}+4n\]

D)

\[3n+2{{n}^{2}}\]

View Answer
4) Statement 1: The function \[{{x}^{2}}({{\operatorname{e}}^{x}}+{{\operatorname{e}}^{-x}})\]is increasing for all \[x>0.\] Statement 2: The functions \[{{x}^{2}}{{e}^{x}}\] and \[{{x}^{2}}{{e}^{-x}}\] are increasing for all \[x>0\] and the sum of two increasing functions in any interval (a, b) is an increasing function in (a, b). JEE Main Online Paper (Held On 22 April 2013)

A)

Statement 1 is false; Statement 2 is true.

B)

Statement 1 is true; Statement 2 is true; Statement 2 is not a correct explanation for Statement 1.

C)

Statement 1 is true; Statement 2 is false.

D)

Statement 1 is true; Statement 2 is true; Statement 2 is a correct explanation for Statement 1.

View Answer
5) Mean of 5 observations is 7. If four of these observations are 6, 7, 8, 10 and one is missing then      the variance of all the five observations is : JEE Main Online Paper (Held On 22 April 2013)

A)

4

B)

6

C)

8

D)

2

View Answer
6) The area of the region (in sq. units), in the first quadrant, bounded by the parabola \[y=9{{x}^{2}}\] and the lines \[x=0,\] \[y=1\] and \[y=4\] is: JEE Main Online Paper (Held On 22 April 2013)

A)

\[7/9\]

B)

\[14/3\]

C)

\[7/3\]

D)

\[14/9\]

View Answer
7) If the \[x-\] intercept of some line L is double as that of the line, \[3x+4y=12\] and the \[y-\]intercept of L is half as that of the same line. Then the slope of L is : jEE Main Online Paper (Held On 22 April 2013)

A)

-3

B)

-3/8

C)

-3/2

D)

-3/16

View Answer
8) The sum \[\frac{3}{{{1}^{2}}}+\frac{5}{{{1}^{2}}+{{2}^{2}}}+\frac{7}{{{1}^{2}}+{{2}^{2}}+{{3}^{2}}}+...\] upto 11 ?terms is: JEE Main Online Paper (Held On 22 April 2013)

A)

\[\frac{7}{2}\]

B)

\[\frac{11}{4}\]

C)

\[\frac{11}{2}\]

D)

\[\frac{60}{11}\]

View Answer
9) The integral \[\int\limits_{7\pi /4}^{7\pi /3}{\sqrt{{{\tan }^{2}}}x\operatorname{d}x}\] is equal to : JEE Main Online Paper (Held On 22 April 2013)

A)

\[\log 2\sqrt{2}\]

B)

\[\log 2\]

C)

\[2\log 2\]

D)

\[\log \sqrt{2}\]

View Answer
10) Let \[\operatorname{R}=\{(3,3),(5,5),(9,9)(12,12),\] \[(5,12),(3,9),(3,12)(3,5),\}\] be a relation on the set A = {3, 5, 9, 12} . Then, R is : JEE Main Online Paper (Held On 22 April 2013)

A)

reflexive, symmetric but not transitive.

B)

symmetric, transitive but not reflexive

C)

an equivalence relation.

D)

reflexive, transitive but not symmetric

View Answer
11) If a complex number z satisfies the equation \[z+\sqrt{2}\left| z+1 \right|+i=0,\operatorname{then}\left| z \right|\] is equal to : JEE Main Online Paper (Held On 22 April 2013)

A)

2

B)

\[\sqrt{3}\]

C)

\[\sqrt{5}\]

D)

\[1\]

View Answer
12) If the 7th term in binomial expansion of \[{{\left( \frac{3}{^{3}\sqrt{84}}+\sqrt{3}\operatorname{In}x \right)}^{9}},x>0,\] equal to 729, then \[x\]cab be :                               JEE Main Online Paper (Held On 22 April 2013)

A)

\[{{e}^{2}}\]

B)

\[e\]

C)

\[\frac{e}{2}\]

D)

\[2e\]

View Answer
13) Statement 1: The line \[x-2y=2\] meets the parabola, \[{{y}^{2}}+2x=0\] only at the point \[(-2,-2):\] Statement 2: The line \[y=mx-\frac{1}{2m}(\operatorname{m}\#0)\]is tangent to the parabola, \[{{y}^{2}}=-2x\] at the point \[\left( -\frac{1}{2{{\operatorname{m}}^{2}}},\frac{1}{\operatorname{m}} \right).\] JEE Main Online Paper (Held On 22 April 2013)

A)

Statement 1 is true; Statement 2 is false.

B)

Statement 1 is true; Statement 2 is true; Statement 2 is a correct explanation for Statement 1.

C)

Statement 1 is false; Statement 2 is true.

D)

Statement 1 is true; Statement 2 is true; Statement 2 is not a correct explanation for Statement 1.

View Answer
14) If a circle C passing though (4, 0) touches the circle \[{{x}^{2}}+{{y}^{2}}+4x-6y-12=0\] externally at point (1, -1), then the radius of the circle C is: JEE Main Online Paper (Held On 22 April 2013)

A)

5

B)

\[2\sqrt{5}\]

C)

4

D)

\[\sqrt{57}\]

View Answer
15) Let Q be the foot of perpendicular from the origin to the plane \[4x-3y+z+13=0\] and R be point (-1, 1, -6) on the plane Then length QR is : JEE Main Online Paper (Held On 22 April 2013)

A)

\[\sqrt{14}\]

B)

\[\sqrt{\frac{19}{2}}\]

C)

\[3\sqrt{\frac{7}{2}}\]

D)

\[\frac{3}{\sqrt{2}}\]

View Answer
16) Given two independent events, if the probability that exactly one of them occurs is \[\frac{26}{49}\] and the probability that nine of them occurs is \[\frac{15}{49},\] then the probability of more probable of the two events is : JEE Main Online Paper (Held On 22 April 2013)

A)

\[4/7\]

B)

\[6/7\]

C)

\[3/7\]

D)

\[5/7\]

View Answer
17) The statement \[p\to (q\to p)\] is equivalent to: JEE Main Online Paper (Held On 22 April 2013)

A)

\[\operatorname{p}\to \operatorname{q}\]

B)

\[\operatorname{p}\left( \operatorname{p}\,\vee \operatorname{q} \right)\]

C)

\[\operatorname{p}\to \left( \operatorname{p}\to \operatorname{q} \right)\]

D)

\[\operatorname{p}\to \left( \operatorname{p}\wedge \operatorname{q} \right)\]

View Answer
18) The maximum area of a right angled triangle with hypotenuse h is : JEE Main Online Paper (Held On 22 April 2013)

A)

\[\frac{{{\operatorname{h}}^{2}}}{2}\sqrt{2}\]

B)

\[\frac{{{\operatorname{h}}^{2}}}{2}\]

C)

\[\frac{{{\operatorname{h}}^{2}}}{\sqrt{2}}\]

D)

\[\frac{{{\operatorname{h}}^{2}}}{4}\]

View Answer
19) If \[\int{\frac{{{x}^{2}}-x+1}{{{x}^{2}}+1}e{{\cot }^{-1}}}x\operatorname{d}x=\operatorname{A}(x){{\operatorname{e}}^{{{\cot }^{-1}}}}x+C,\] then A\[\left( x \right)\] is equal to : JEE Main Online Paper (Held On 22 April 2013)

A)

\[-x\]

B)

\[x\]

C)

\[\sqrt{1-x}\]

D)

\[\sqrt{1+x}\]

View Answer
20) If two vertices of an equilateral triangle are \[\operatorname{A}(-a,0)\] and \[B(a,\,0),\,a>0\], the third vertex C lies above \[x-\]axis then the equation of the circumcircle of \[\Delta \operatorname{ABC}\] is : JEE Main Online Paper (Held On 22 April 2013)

A)

\[3{{x}^{2}}+3{{y}^{2}}-2\sqrt{3}ay=3{{a}^{2}}\]

B)

\[3{{x}^{2}}+3{{y}^{2}}-2ay=3{{a}^{2}}\]

C)

\[{{x}^{2}}+{{y}^{2}}-2ay={{a}^{2}}\]

D)

\[{{x}^{2}}+{{y}^{2}}-\sqrt{3}ay={{a}^{2}}\]

View Answer
21) The acute angle between two lines such that the direction cosines I, m, n of each of them satisfy the equations I + m + n = 0 and \[{{\operatorname{I}}^{2}}+{{\operatorname{m}}^{2}}-{{\operatorname{n}}^{2}}=0\] is: JEE Main Online Paper (Held On 22 April 2013)

A)

\[{{15}^{0}}\]

B)

\[{{30}^{0}}\]

C)

\[{{60}^{0}}\]

D)

\[{{45}^{0}}\]

View Answer
22) Consider the differential equation \[\frac{dy}{dx}=\frac{{{y}^{3}}}{2(x{{y}^{2}}-{{x}^{2}})}:\] Statement 1: The substitution \[z={{y}^{2}}\] transforms the above equation into a first order homogenous differential equation. Statement 2: The solution of this differential equation is \[{{y}^{2}}e\frac{-{{y}^{2}}}{x}=C.\]

A)

Both statements are false.

B)

Statement 1 is rue and statement 2 is false.

C)

Statement 1 is false. Statement 2 is true

D)

Both statement s are true.

View Answer
23) The number of solution of the equation, \[{{\sin }^{-1}}\] \[x=2\] \[{{\tan }^{-1}}\] \[x\] (in principal values is :) JEE Main Online Paper (Held On 22 April 2013)

A)

1

B)

4

C)

2

D)

3

View Answer
24) For \[>0,\operatorname{t}\in \left( 0,\frac{\pi }{2} \right),\] let \[x=\sqrt{{{a}^{\sin -1}}t}\] and \[y=\sqrt{a{{\cos }^{-1}}\operatorname{t}}.\] Then , \[1+{{\left( \frac{\operatorname{dy}}{dx} \right)}^{2}}\]equals: JEE Main Online Paper (Held On 22 April 2013)

A)

\[\frac{{{x}^{2}}}{{{y}^{2}}}\]

B)

\[\frac{{{y}^{2}}}{{{x}^{2}}}\]

C)

\[\frac{{{x}^{2}}+{{y}^{2}}}{{{y}^{2}}}\]

D)

\[\frac{{{x}^{2}}+{{y}^{2}}}{{{x}^{2}}}\]

View Answer
25) If p, q, r are 3 real numbers satisfying the matrix equation, \[[p\,q\,r]\left[ \begin{matrix}    3 & 4 & 1 \\    3 & 2 & 3 \\    2 & 0 & 2 \\ \end{matrix} \right]=[3\,\,0\,\,1]\] then \[2\operatorname{p}+\operatorname{q}-\operatorname{r}\] equals: JEE Main Online Paper (Held On 22 April 2013)

A)

-3

B)

-1

C)

4

D)

2

View Answer
26) If \[\hat{a},\hat{b}\] and \[\hat{c}\] are unit vectors satisfying \[\hat{a}-\sqrt{3}\] \[\hat{b}+\hat{c}=\overset{\to }{\mathop{0}}\,\] then the angle between the vectors \[\hat{a}\] and \[\hat{c}\] is : JEE Main Online Paper (Held On 22 April 2013)

A)

\[\frac{\pi }{4}\]

B)

\[\frac{\pi }{3}\]

C)

\[\frac{\pi }{6}\]

D)

\[\frac{\pi }{2}\]

View Answer
27) Let the equations of two ellipses be                 \[{{\operatorname{E}}_{1}}:\frac{{{x}^{2}}}{3}+\frac{{{y}^{2}}}{2}=1\] and                 \[{{\operatorname{E}}_{2}}:\frac{{{x}^{2}}}{16}+\frac{{{y}^{2}}}{{{\operatorname{b}}^{2}}}=1\]. If the product of their eccentricities is \[\frac{1}{2},\] then the length of the minor axis of ellipse \[{{\operatorname{E}}_{2}}\] is: JEE Main Online Paper (Held On 22 April 2013)

A)

8

B)

9

C)

4

D)

2

View Answer
28) If \[\alpha \] and \[\beta \] are roots of the equation \[{{x}^{2}}+\operatorname{p}x+\frac{3\operatorname{p}}{4}=0,\] such that \[\left| \alpha -\beta \right|\]=\[\sqrt{10},\]then p belongs to the set: JEE Main Online Paper (Held On 22 April 2013)

A)

{2, -5}

B)

{-3, 2}

C)

{-2, 5}

D)

{3, -5}

View Answer
29) Statement 1: The number of common solution of the trigonometric equations \[2{{\sin }^{2}}\theta -\cos 2\theta =0\] and 2\[{{\cos }^{2}}\theta -3\] \[\sin \theta =0\]in the interval [0, 2\[\pi \]] is two : Statement 2: The number of solutions of the equation, \[2{{\cos }^{2}}\theta -3\]\[\sin \theta =0\] in the interval \[\left[ 0,\pi \right]\] is two JEE Main Online Paper (Held On 22 April 2013)

A)

Statement 1 is true; Statement 2 is true; Statement 2 is a correct explanation for Statement 1.

B)

Statement 1 is true; Statement 2 is true; Statement 2 is not a correct explanation for Statement 1.

C)

Statement 1 is false; Statement 2 is true.

D)

Statement 1 is true; Statement 2 is false.

View Answer
30) Let \[f(x)=-1+\left| x-2 \right|,\]and g\[\left( x \right)=1-\left| x \right|;\] then the set of all points where \[fog\] us discontinuous is :

A)

{0, 2}

B)

{0, 1, 2}

C)

{0}

D)

an empty set

View Answer

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Solved papers for JEE Main & Advanced JEE Main Paper (Held On 22 April 2013)

done JEE Main Paper (Held On 22 April 2013) Total Questions - 30

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JEE Main Online Paper (Held On 22 April 2013)

JEE Main Paper (Held On 22 April 2013) Total Questions - 30