If a=3i-j-2k, b=2i+3j+k then (a+2b)x(2a-b)=
25i+35j-55k
25i-35j-55k
-25i-35j-55k
-25i+35j-55k
If cos 2θ+cos 8θ= cos 5θ then θ=
(2n+1) π/4 : n ε Z or 2n π ± 2 π/3: n ε Z
nπ/4: n ε Z or nπ ± π/6: n ε Z
nπ: n ε Z or (2n+1) π/9: n ε Z
(2n+1) π / 10: n ε Z or 2nπ/3 ± π / 9: n ε Z
If (a+bx)ey/x=x,then x3y2=
xy1-y
(y1-xy)2
(xy1-y)2
(y1-xy)3
The equations of the tangents to the hyperbola 3x2-4y2=12 which are parallel to the line 2x+y+7 =0 are
2x+y±√13=0
3x-y±√6=0
3x-y±2=0
3x-y±√2=0
If sin θ+ cos θ=a then sin4 θ+ cos 4 θ=
1-(1/2) (a2+1)2
1-(1/2) (a2-1)2
1+ (1/2) (a2+1)2
1+ (1/2) (a2-1)2
If a=2i+j-3k, b=i-2j+k then the vector of length 2√3 and perpendicular to both a and b is
i+j+k
i-j-k
2i+2j+2k
2i-2j-2k
8sin4θ=
cos 4θ-4cos 2θ+3
cos 4θ-4cos 2θ-3
cos 4θ+4cos 2θ+3
cos 4θ+4cos 2θ-3
If x= a {cos θ + log tan (θ/2)} and y = a sin θ then dy/dx=
cot θ
tan θ
sin θ
cos θ
If the tangent at P on the circle x2+y2=a2 cuts two parallel tangents of the circle at A and B then PA. PB=
a
a2
2a
2a2
If p and q are the coefficients of xn in (1+x)2n-1 and (1+x)2n respectively then 2p=
q
2
1
3
A: The polar of (2, 3) with respect to the circle x2+y2-4x-6y+5=0 is 2x+3y=0 R: The polar of (x1, y1) with respect to the circle S=0 is S1=0
Both A and R are true and R is the correct explanation of A
Both A and R are true but R is not correct explanation of A
A is true but R is false
A is false but R is true
The coefficient of xr in (1+x)2/(1-2x)3 is
2r(9r2+15r+8)
2r-2(r2+9r+15)
2r-3(9r2+15r+8)
none
In measuring the circumfence of a circle, there in an error of 0.05 cm. if with this error the circufence of the circle is measured of the circle is measured as c cm, then the percentage error in area is
0.1/c
0.01/c
0.001/c
10/c
The locus of the midpoint of the chord of the circle x2+y2=25 which subtends a right angle at (2,-3) is
x2+y2+2x-3y-6=0
x2+y2-2x-3y-12=0
x2+y2-2x+3y-6=0
x2+y2+2x+3y-24=0
The equation to the pair of tangents drawn from (3,-2) to the parabola y2 = x is
X2 + 8y + 12y2 + 10x + 24y + 9 = 0
2x2 + 3xy -22y2 + 15x + 4y + 9 = 0
3x2 + 18xy + 22y2 + 50x +64y + 19 = 0
X2 – 8y – 12y2 – 10x – 24y + 9 = 0
The probabilities of problem being solved by two students are 1/2 and 1/3.Find the probability of the problem being solved.
2/3
4/3
1/3
d/dx{Tan-1(acos x-bsin x/b cos x+a sin x)}=
-1
1/2
-1/2
If three complex numbers are in A.P. then they lie on
A straight line
A circle
A parabola
None
The equation of the tangent to the curve y=x+9/x+5 so that is passes through the origin is
ax+by=1
x/a+y/b=1
x/b+y/a=1
ax-by=1
If cos α+ cos β=0= sin α + sin β then cos(α - β)=
0
If α,β,γ are the roots of the equation x3+px2+qx+r=0,then Σ(α-β)2=
2(p2-3q)
r-p q
q2-2pr
p2-2q/r2
Match the following Parabola Focus y2 –x – 2y + 2 = 0 (1,2) y2 – 8x – 4y – 4 = 0 (-2,5) x2 + 4x – 8y + 28 = 0 (1,-1) x2 – 2x – 8y – 23 = 0 (5/4,1)
A,b,c,d
B,c,a,d
D,a,b,c
B,d a,c
If tan(α+θ)= ntan(α-θ), then (n+1)sin 2θ=
(n+1) sin 2α
(n-1) sin 2α
(n+1) sin 2β
(n-1) sin 2β
The radii of two circles are 2 units and 3 units.If the radical axis of the circles cuts one of the common tangents of the circles in P then ratio in which P divides the common tangent is
2:3
3:2
4:9
1:1
The locus of the middle points of the chords of the circle x2+y2=8 which are at a distance of √2 units from the centre of circle is
x2+y2=1/2
x2+y2=4
x2+y2=1
x2+y2=2
If x -y+ 1 = 0 meets the circle x2 + y2 + y - 1 = 0 at A and B, then the equation of the circle with AB as diameter is
2 (x2 + y2) + 3x - y + 1=0
2(x2 + y2) + 3x - y + 2 = 0
2(x2 + y2) + 3x-y +3 = 0
x2 + y2 + 3x-y +1 = 0
If the tangent at any point on the curve x4+y4=a4 cuts off intercepts p and q on the coordinates axes then p-4/3+q-4/3=
a-4/3
a-1/2
a1/2
The value of k for which the points A(1, 0, 3), B(-1, 3, 4), C(1, 2, 1) and D(k, 2, 5) are coplanar is
A tangent to the circle x2+y2=4 meets the coordinate axes at P and Q. The locus of mindpoint of PQ is
1/x2+1/y2=1
1/x2+1/y2=1/4
1/x2+1/y2=1/2
If sin-1 (3/5)+sin-1(5/13)= sin-1 x, then x=
51/65
52/65
56/65
none of these
The shortest distance between the straight line passing through the point A=(6, 2, 2) and parallel to the vector(1, -2, 2) and the straight line passing through A’=(-4, 0, 1) and parallel to the vector (3, -2, -2) is
9
8
5
u = u(x, y) = sin (y+ax) - (y+ax)2 ===>
uxx = a2 . uyy
uyy = a2 uxx
uxx = -a2 . uyy
uyy = - a2 uxx
cos (θ + α).cos (θ - α)+ sin (θ + α). sin(θ - α)=
cos 2α
sin 2α
cot 2α
tan 2α
1.2+2.3+3.4+….n terms
n(n+1)(n+5)/3
n(n+1)(n+2)/3
n(4n2+6n-1)/3
n(n+1)(n+2)
If A=i+2j+3k, B=3i+4j+7k and C= 2i+3j+5k are collinear, then the ratio in which B divides is
2:1 externally
2:1 internally
4:1 externally
The points (1, 6) and (12, 9) are two opposite vertices of a parallelogram. The other two vertices lie on the line 3y =11x+k. Then k=
35
49
-35
-49
If θ is the angle between the curves y2=4ax, ay=2x2 at (a, 2a) then tan θ=
¾
3/5
5/14
If the points (0,0), (3,√3), (x,y) form an equilateral triangle, then (x,y)=
(0,2√3), (3,-√3)
(1,2√3),(3,√3)
(1,√3), (3,-√3)
If the roots of x2+bx+c=0 are two consecutive integers then b2-4c=
A point is moving on y = 4-2x2. The x-co-ordinate of the point is decreasing at the rate of 5 units per second. Then the rate at which y co-ordinate of the point is changing when the point isat (1, 2) is :
5 unit/s
10 unit/s
15 unit/s
20 unit/s
The area of the triangle formed by the points (a,b+c), (b,c+a), (c,a+b) is
abc
2ab
3abc
Equation of the latusrectum of the parabola x2 + 8x + 12y + 4=0 is
y + 3=0
y + 2=0
y + 1=0
y + 5=0
The equation whose roots are those of xn+xn-2+xn-5+m=0 with contrary signs (n is even as n≥6)
xn-xn-2-xn-5+m=0
xn+xn-2+xn-5+m=0
xn+xn-2-xn-5+m=0
xn-xn-2+xn-5+m=0
If α+β=-2 and α3+β3=-56 then the quadratic equation whose roots α,β is
x2+2x-16=0
x2+2x-15=0
x2+2x+12=0
x2+2x-8=0
The equation of the circle with centre (3, -2) and radius 3 is
x2+y2-6x+y+4=0
x2+y2-4x+6y+9=0
x2+y2+14x+6y-42=0
x2+y2+2x+16y+40=0
A person of height 180 cm starts from a lamp post of height 450 cm and walks at the constant rate of 4 km per hour. The rate at which his shadow increases is
2kmph
6.4kmph
8/3kmph
4kmph
The equation of the circle passing through the point (1, 2) cutting the circle x2+y2-2x+8y+7=0 orthogonally and bisects the circumference of the circle x2+y2=9 is
5(x2+y2)-11x+11y-17=0
3(x2+y2)+10x+y-27=0
2(x2+y2)+5x+6y-17=0
(x2+y2)-11x-y-27=0
If |x|
(x/1-x)+log(1-x)
(x/1-x)+log(1+x)
(x/1+x)+log(1+x)
(x/1+x)+log(1-x)
The internal centre of similitude of the two circles x2+y2+6x-2y+1=0, x2+y2-2x-6y+9=0 is
(1, 1/20)
(-1/3, -1)
(0, 5/2)
(0, 1)
When a circular oil drop expands on water, its area increases at the uniform rate of 40sq. cm per minute. The rate of increase in the radius when the radius 5 cm is
4/π cm/m
1/200 cm/m
8cm/m
4 cm/ma
The value of k,so that the sum and products of the roots of 2x2+(k-3)x+3k-5=0 are equal is
A bag contain 6 white and 4 black balls. A fair die is rolled and a number of balls equal to that appearing on the die is chosen from the bag at random. The probability that all the balls selected are white is
1/5
1/6
1/7
1/8
d/dx{(2x-3)/(3x+1)}=
7/(2x+5)2
11/(3x+1)2
41/(2x+7)2
5/(3x+5)2
The magnitude of the projection of the vector a = 4i - 3j + 2k on the line which makes equal angles with the coordinate axes is
√2
√3
1/√3
1/√2
The number of solutions of the system of equations 2x+y-z =7,x-3y+2z =1,x+4y-3z =5 is
The area (in square units) of the triangle formed by the lines x = 0,y = 0 and 3x + 4y = 12, is
4
6
12
In a class of 10 students, there are 3 girls A,B,C.The number of different ways that they can be arranged in a row such that no two of the three girls are consecutive is
10!
7! 8!
7! 8! /5!
7! 8! 3! /5!
The radical axis of the circles x2+y2-6x-4y-44=0 and x2+y2-14x-5y-24=0 is
8x+y-30=0
8x+y+20=0
8x+3y-20=0
8x+y-20=0
The foot of the perpendicular from the point (3, 4) on the line 3x-4y+5=0 is
(81/25, 92/25)
(92/25, 81/25)
(46/25, 54/25)
(-81/25, 92/25)
The orthocentre of the triangle formed by the points(2,1,5), (3,2,3), (4,0,4) is
(2,1,5
(3,2,3)
(4,0,4)
(3,1,4)
If y=(1+x2)Tan-1x then y2=
(2x/1+x2)+2 Tan-1x
(2x/1+x2)-2Tan-1 x
(2x/1-x2)+ 2 Tan-1x
(2x/1-x2)-2 Tan-1x
If sin A= sin2 B and 2 cos2 A =3 cos2 B, then the ΔABC is
right angled
obtuse angled
isosceles
equilateral
If the coefficients of (2r+1)th term and (4r+5)th term in the expansion of (1+x)10 are equal then r=
The circumcentre of the triangle formed by(0,0), (2, -1) and ( -1, 3) is (5/2,5/2). Then the orthocentre is
(-4, -3)
(4, 3)
(-4, 3)
(4, -2)
Write the descending order of the perpendicular distance of the line 2x-y+5=0 from A) (2, 1) B) (2, -1) C (-2, 1) D (-2, -1)
A, B, C, D
B, A, D, C
B, D, C, A
B, C, D, A
If 23+43+63+….+(2n)3=kn2(n+1)2, then k=
3/2
If α,β,γ are the roots of a cubic equation satisfying the relations α+β+γ=2,α2+β2+γ2=6 and α3+β3+γ3=8 then the cubic equation is
x3+2x2-x+2=0
x3-2x2-x+2=0
x3-2x2+x+2=0
x3-2x2-x-2=0
If f(x)=x3-x, g(x)=sin 2x, then
g{f(2)}= sin 2
g{f(1)}=1
f{g(π/12)}=-3/8
f{f(1)}=2
The distance between the points (5, 3, 1), (3, 2, -1) is
For the parabola y2 +6y-2x+5 = 0(I) The vertex is (-2 , -3)(II) The directrix is y+3 = 0
Both I and II are true
I is true, II is false
I is false, II is true
Both I and II are false
If the origin is the centroid of the tetrahedron for which (2,-1,3), (-1,3,1), (3,4,-2) are three vertices then the fourth vertex is
(4,6,2)
(-4,-6,-2)
(-4,6,-2)
(4,-6,2)
sin 1200 cos 1500-cos 2400 sin 3300 is equal to :
-2/3
Let v- = 2i- + j- - k- and u- = i- + 3k- . If u is any unit vector then the maximum value of the scalar triple product [u- v- w-] is
√10 + √6
√59
√60
Solution of differential equation dy/dx = (1+y2) (1+x2)-1is
y-x=c(1+xy)
y+x=c(1+xy)
y+x=c(1-xy)
y-x=c(1-xy)
The diameter x of a circle is found by measurements to be 5 cm with maximum error of 0.05 cm. the relevant error in the area is
0.02
0.002
0.0002
The angle between the lines joining the origin to the points of intersection of 3x-y+1=0 and x2+2xy+y2+2x+2y-5=0 is
π/4
π/3
π/2
cos-1((13)/(√193))
The locus of the midpoint of chords of the parabola y2 = 4ax parallel to the line y = mx + c is
X = 2a
X – 2a/m
Y = 2a
Y = 2a/m
The locus of the midpoint of the chords of the parabola y2= 6x which touch the circle x2 + y2 + 4x – 12 = 0 is
(y2 – 3x – 6)2 = 16 (y2 + 9)
(x2 – 3y – 16)2 = 16 (y2 + 19)
G(y2 + 3x + 6)2 = 16(y2 – 9)
2 (y2 + 3x + 6)2 = 16 (y2 – 9)
If the normal at (1,2) on the parabola again at the point (l2,2t), then the value of t is
-3
If the foot of the perpendicular from (0,0,0) to a plane is (1,2,3), then the equation of the plane is
2x+y+3z =14
x+2y+3z =14
x+2y+3z+14=0
x+2y -3z =14
If the roots of a(b-c)x2+b(c-a)x+c(a-b)=0 are equal,then a,b,c are in
A.P
G.P
H.P
The equation of the circle passing through the points of intersection of the circlesx2+y2=5, x2+y2+12x+8y-33=0 and touching x-axis is
x2+y2-6x-4y+9=0, 9x2+9y2-30x-20y+25=0
3 x2+3y2-16x-40y+29=0, 9x2+9y2-30x-20y+25=0
x2+y2-6x-4y+9=0, 9x2+9y2-30x-20y-25=0
x2+y2-6x-4y+9=0, x2+y2-10x+50y-25=0
A pole of height h stands at one corner of a park in the shape of an equilateral triangle. If α is the angle which the pole subtends at the midpoint of the opposite side, the length of each side of the park is
(√3/2) h cot α
(2/√3) h cot α
(√3/2) h tan α
(2/√3) h tan α
The two circles (x-a)2+(y-b)2=c and (y-b)2+x2=4c have only one real common tangent then
a2+b2=c
b2+c2=a2
a2+b2=4c2
a2+b2=9c
The domain of sin-1(2x-7) is
(3, 4)
[3, 4]
[-π/4 + 7/2, π/4 + 7/2]
(sin 3A+ sin A) sin A+ (cos 3A- cos A) cos A=
The equation of the circle passing through the intersection of the circles x2+y2=2ax and x2+y2=2by and having its centre on the x/a-y/b=2 is
x2+y2-3ax+by=0
x2+y2+3ax-by=0
x2+y2-3ax-by=0
x2+y2+3ax+by=0
If the lines 3x + 4y - 14 = 0 and 6x + 8y + 7 = 0 are both tangents to a circle, then its radius is
7
7/2
7/4
7/6
The value of √3cot 200- 4cos 200 is
If 2x2-3xy+y2=0 represents two sides of a triangle and lx+my+n=0 is the third side then the locus of incentre of the triangle is
3x2+2xy-3y2=0
2x2+3xy+y2=0
3x2-2xy-3y2=0
2x2-3xy-2y2=0
The locus of the point of intersection of two tangents to the parabola y2 = 4ax which make the angle θ1 and θ2 with the axis so that cot θ1 + cos θ2 = k is
Kx – y = 0
Kx – a = 0
Y – ka = 0
X – ka = 0
(sin 3θ/ sin θ)-(cos 3θ/ cos θ)=
The equation of the circle passing through (0,0) and the points of intersection of x2+y2-4x-6y+9=0 and x2+y2+4x-2y-4=
x2+y2-20x-42y=0
x2+y2+20x-42y=0
5x2+5y2+52x+6y=0
13x2+13y2+20x-42y=0
If α,β are the roots of ax2+bx+c=0 and γ,δ are the roots of lx2+mx+n=0,then the equation whose roots are αγ+βδ and αδ+βγ is
a2l2x2-2ablmx+b=0
a2l2x2-ablmx+(b2nl+m2ac-4acnl)=0
a2l2x2-ablmx
If the vectors i - 2xj - 3yk and i + 3xj + 2yk are orthogonal to each other, then the locus of the point (x, y) is
a circle
an ellipse
a parabola
a straight line
cos2 π/5+ sin2 4π/5=
The equation of tangent to the curve y=x+9/x+5 so that is passes through the origin is
x+y=0
x-y=0
x+y=1
x-y=1
I. In a class 25% of thestudents failed in mathematics, 30% failed in chemistry and 15% failed in both Mathematics and chemistry. If a student is selected at random failed in Mathematics, the probability that he failed in chemistry is 1/2 II: A bag contain 10 identical balls of which 4 are blue and 6 are red. 3 balls are taken out at random from the bag one after the other. The probability that all the 3 balls drawn are red is 1/6
Only I is true
Only II is true
Both I and II is true
Neither I nor II true
The inverse of f(x)=10x-10-x/ 10x+10-x is
log10(2-x)
1/2 log10 1+x/1-x
1/2 log10(2x-1)
1/4 log 2x/2-x
The condition that the lines joining the origin to the points of intersection of 2x+3y=k,3x2-xy+3y2+2x-3y-4=0 are at a right angles is
6k2+5k+52=0
6k2+5k-52=0
6k2-5k+52=0
6k2-5k-52=0