If tan A,tan B are the roots of x2-px+q=0,the value of sin2(A+B) is
p2/p2+(1-q)2
p2/p2+q2
q2/p2+(1-q)2
p2/(p+q)2
The approximate value of e2 is
7.2
7.3
7.4
7.5
B and C are two points on the circle x2+y2=a2. From a point A(b, c) on that circle AB=AC=d. The equation to Bc is
bx+ay=a2-d2
bx+ay=d2-a2
bx+ay=2a2-d2
2(bx+ay)=2a2-d2
If (a+bx)ey/x=x,then x3y2=
xy1-y
(y1-xy)2
(xy1-y)2
(y1-xy)3
The equation whose roots are the Arithmetic mean and twice the H.M between the roots of the equation x2+ax-b=0 is
2ax2+(a2-8b)x+4ab=0
2ax2+(a2-8b)x-4ab=0
2ax2+(a2+8b)x-4ab=0
none
The equation of the line passing through the point of intersection of the lines 2x+3y-4=0, 3x-y+5=0 and the origin is
2x+y=0
2x+3y-4=0
x+2y+1=0
2x-y-12=0
If 5,-7,2 are the roots of lx3+mx2+nx+p=0 then the roots of lx3-mx2+nx-p=0 are
-7,-5,2
7,-5,-2
5,7,2
5,-7,-2
India plays two matches each with west indies and Australia. In any match the probabilities of India getting points 0,1 and 2 are 0.45,0.05 and 0.50 respectively. Assuming that the outcomes are independent, the probability of getting at least 7points is
0.8750
0.0875
0.0625
0.0250
Suppose A, B are two points on 2x-y + 3=0 and P(l, 2) is such that PA = PB. Then the mid-point of AB is :
( -1/5, 13/5 )
( -7/5 , 9/5 )
( 7/5 , -9/5 )
( -7/5, -9/5 )
The area of the triangle whose vertices are (a,θ),(2a,θ+π/3) and (3a,θ+2π/3) is (in sq.unit)
7√3a2/4
5√3a2/4
3√3a2/4
√3a2/4
If f : R → R is continuous such that f(x + y) = f(x) + f(y), ∀x∈R, y∈R, and f(1) = 2 then f(100) =
100
50
0
200
If the length of the tangent from (h, k) to the circle x2+y2=16 is twice the length of the tangent from the same point to the circle x2+y2+2x+2y=0, then
h2+k2+4h+4k+16=0
h2+k2+3h+3k=0
3h2+3k2+8h+8k+16=0
3h2+3k2+4h+4k+16=0
How many different combination of 5 can be formed 6 men and 4 women on which exact 3 men and 2 women serve
6
20
60
120
If tan(π/4+θ)+tan(π/4- θ)=3, then tan2 (π/4+θ)+ tan2 (π/4-θ)=
4
7
5
The ascending order of A= Sin-1(log32),B= Cos-1(log3(1/2)), C=Tan-1(log1/3 2) is
C,B,A
B, A,C
C, A, B
B, C, A
d/dx{x√a2+x2+a2Sinh-1(x/a)}=
2√a2+x2
2√a2-x2
2√x2-a2
(a+b)xc+(b+c)xa+(c+a)xb=
a+b
a-b
axb
The equation to the sides of a triangle are x-3y=0, 4x+3y=5, 3x+y=0. The line 3x-4y=0 passes through
The in center
The centroide
The circum center
The orthocenter of the triangle
The angle of the elevation of the top of a tower is 450 from a point 10 mt above the water level of a lake. The angle of depression of its image in the lake is 600. The height of the tower is
10 (2+√3) mt
27 (2+√3) mt
10 (2-√3) mt
75 (3+√3) mt
The locus of the centre of the circles which touché both the circles x2+y2=a2 and x2+y2=4ax externally has the equation
12(x-a)2-4y2=3a2
9(x-a)2-5y2=2a2
8x2-3(y-a)2=9a2
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
From any point on the circle x2+y2=a2 tangents are drawn to the circle x2+y2=a2 sin2θ. The angle between them is
θ/2
θ
2θ
If 2,3 are the roots of the equation 2x3+px2-13x+q=0,then (p,q)=
(-5,-30)
(-5,30)
(5,-30)
(5,30)
The length of the conjugate axis of the hyperbola 9x2-16y2-18x-64y+89=0 is
8
The maximum value of the area of the triangle with vertices (a, 0), (a cos θ, b sin θ), (a cos θ, -b sin θ) is
3√3ab/4
3√ab
√3ab/4
3√3ab
The angle between the lines 4x-y+9=0, 25x+15y+27=0 is
π/2
π/4
π/6
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
2
0.02
0.002
0.0002
2(sin6 x+ cos6 x)-3(sin4 x+ sin2 x)+1=
-1
1
A+B= C⇒cos2A +cos2B + cos2C - 2 cos A cos B cos C
3
The solution of ex-y dx+ey-x dy=0 is
e2x-e2y=c
e2x+e2y=c
ex+ey=c
ex-ey=c
The equation to the conjugate hyperbola of xy+3x-4y+13=0 is
(x-4)(y+3)=-25
(x-4)(y+3)=25
xy+3x-4y-13=0
(x-4)(y+3)=0
If θ is the angle between the curves y2=4ax, ay=2x2 at (a, 2a) then tan θ=
¾
3/5
5/14
The sum and product of the slops of the tangents to the hyperbola 2x2-3y2=6 drawn from the point (-1,1) are
1,-3
1,-3/2
2, -3/2
3,-2/2
If tan-13 + tan-1n= tan-18, then n is equal to
1/5
14/5
The line y = x√2 + λ is a normal to the parabola y2 = 4ax, then λ =
4√2
-4√2
2√2
-2√2
If f(x)=cos2x+cos2(600+x) + cos2(600-x) and g(3/2)=5 then gof(x)=
5 d) 15/2
15/2
If 2x-3y=5 and 3x-4y=7 are the equation of two diameters of a circle whose area is 154sq units, then the equation of the circle is
x2+y2+2x-2y-47=0
x2+y2-2x+2y-49=0
x2+y2-2x+2y+47=0
x2+y2-2x+2y-47=0
If a,b,c are the fifth terms of loge(3/2), loge(4/3), loge(6/5) then the ascending order of a,b,c is
a,b,c
b,c,a
c,a,b
a,c,b
The equation of the circle whose diameter is the common chord of the circlesx2 + y2 + 2x + 3y + 2 = 0 and x2 + y2 + 2x-4y-4 = 0 is
x2 + y2 + 2x + 2y + 2 = 0
x2 + y2 + 2x + 2y-l =0
x2 + y2 + 2x + 2y + l =0
x2 + y2 + 2x + 2y+ 3= 0
The centre of the circle passing through the points (0, 0), (1, 0) and touching the circle x2+y2=9 is
(3/2, 1/2)
(1/2, 3/2)
(-1/√2, 1/√2)
(1/2, -√2)
Statement I : If f:A→B, g:B→C are such that gof is an injection, then f is an injection. Statement II : If f:A→B, g:B→C are such that gof is an injection, then g is an injection. The correct statement is
only I
only II
I&II
Neither I nor II
The length of the diameter of the circle x2+y2-6x-8y=0
10
15
If an error of 0.01 cm is made while measuring the radius 10cm of a circle, then the relative error in the area is
0.02π sq.cm
4.4sq.cm
0.4π cm
0.6π cm
The coefficient of x2y3z4 in the expansion of (ax-by+cz)9 is
1260a2b3c4
-1260a2b3c4
-1220a2b3c4
1220a2b3c4
If 3x-2y+4=0 and 2x+5y+k=0 are conjugate lines w.r to the ellipse 9x2+16y2=144 then the value of k is
5/2
-5/2
7/2
3/2
The range of 5 Co-1(3x) is
[0, 5π]
[-3, 3]
[-1, 1]
[0, π]
If the first three terms of (1+ax)n are 1,6x,6x2 then (a,n)=
(2/3, 9)
(2/5, 8)
(3/2, 6)
(5/2, 3)
The area of the triangle formed by the points(0,0)(3,π/2)(5,π/2) in sq.units
15/8
15/4
The equation of the transverse and conjugate axes of a hyperbola are respectively. X+2y-3=0, 2x-y+4=0 and their respective lengths are √2 and 2/√3. The equation of the hyperbola is
2/5(x+2y-3)2-3/5(2x-y+4)2 =1
2/5(2x+y+3)2-3/5(x+2y-3)2 =1
2(2x-y+4)2-3(x+2y-3)2 =1
2(x+2y-3)2-3(2x-y+4)2 =1
The locus of the middle point of chords of the ellipse x2/a2+y2/b2=1 which are at a constant distance d from the centre of the ellipse is
(x2/a2+y2/b2)2=d2 (x2/a4+y2/b4)
(x2/a2+y2/b2)2= (x2/a4+y2/b4)
(x2/a2+y2/b2)2=2d2 (x2/a4+y2/b4)
(x2/a2+y2/b2)2=d2 (x2/a4-y2/b4)
sin 2θ / (1+ cos 2θ) =
sin θ
cos θ
tan θ
cot θ
If the area of the triangle formed by the pair of lines 8x2-6xy+y2=0 and the line 2x + 3y = a is 7 then
14
14√2
28√2
28
The orthocentre of the triangle formed by(2,-1/2), (1/2,-1/2)and (2,√3-1/2) is
(3/2,(9√3-3)/6)
(2,-1/2)
(5/4,(√3-2)/4)
(1/2,-1/2)
The number of ways of arranging 8 men and 4 women around a circular table such that no two women can sit together is
8!
4!
8!4!
7!8P4
d/dx{log(x2/ex)}=
2/x+1
2/x-1
-2/x+1
If cos-1 x= cot-1(4/3)+Tan-1(1/7), then x=
1/2
√3/2
1/√2
The distance of the point (1,2) from the common chord of the circles x2+y2-2x-6y-6=0 and x2+y2+6x-16=0 is
The angle between the curves y=x2 and y=4-x2 is
tan-1(6/13)
tan-1(3/4)
tan-1(5/√3)
tan-1(4√2/7)
The transformed equation of x3+6x2+12x-9=0 by eliminating second term is
x3-27=0
x3+27=0
x3-3x+27=0
x3+3x+27=0
If two roots of x4-16x3+86x2-176x+105=0 are 1,7 then the roots are
-11/2,3/5,1,7
1,7,3,5
3,-5,1,7
1,7,√2,√5
A stone is dropped into a quiet pond and waves move in circles outward from the place where it strikes, at a speed of 30 cm per second. At the instant when the radius of the wave ring is 50mt, the rate of increase in the area of the wave ring is
0.75sq.cm/sec
30sq.cm/sec
30πsq.cm/sec
0.4πsq.cm/sec
If α,β,γ are the roots of x3+2x2-4x-3=0 then the equation whose roots are α/3,β/3,γ/3 is
3x3+5x2-7x-1=0
9x3+6x2-4x-1=0
x3-3x2+8x2+4=0
10x3-13x2+18x2+40=0
The vector area of the parallelogram whose diagonals are i+j-2k, 2i-j+2k is
1/2(i+4j-3k)
1/2(i-4j+3k)
1/2(i+4j+3k)
1/2(i-4j-3k)
Out of 7 consonants and 5 vowels how many different words can be formed each consisting of 3 consonants and 2 vowels?
350
42,000
4,200
none of these
The equation of the tangent to the circle x2+y2-2x-4y+3=0 at (2, 3) is
x+2y-10=0
x+2y-5=0
3x+2y-13=0
3x+3y-23=0
If 2x-y+3=0, 4x+ky+3=0 are conjugate with respect to the ellipse 5x2+6y2-15=0 then k=
If A=(3,-4) and the midpoints of AB,AC are (2,-1), (4,-5) respectively then the midpoint of BC is
(1,2)
(3,-2)
(-1,2)
(0,-3)
tan 2030+tan 220+tan 2030 tan 220 =
A straight line which makes equal intercepts on positive X and Y axes and which is at a distance 1 unit from the origin intersects the straight line y =2x+3+√2 at (x0, y0). Then 2x0+y0=
3+√2
√2-1
The distance between the limiting points of the coaxial system x2 + y2 – 4x – 2y – 4 + 2λ(3x + 4y + 10)=0
2√7
√7
4√7
8√7
∫ (sin6x/cos8x) dx is equal to
tan 7x+c
tan7x / 7 +c
sec7x+c
The polars of the points (3, 4),(-5, 12) and (6, t) with respect to a circle are concurrent. Then t=
2+3+5+6+8+9+…..2n terms=
3n2+2n
4n2+2n
4n2
The radical centre of the circle x2+y2=1, x2+y2-2x=1, x2+y2-2y=1 is
(0, 0)
(1, 1)
(1, 0)
(0, 1)
The equation of the image of the circle x2+y2-6x-4y+12=0 by the line mirror x+y-1=0 is
x2+y2+2x+4y+4=0
x2+y2-2x+4y+4=0
x2+y2+2x+4y-4=0
x2+y2+2x-4y+4=0
.In ΔABC, if 2R+ r= r1, then the triangle isa
isosceles
equilatcral
right angled
If the circles x2+y2+2x+c=0 and x2+y2+2y+c=0 touch each other then c=
1/4
If f(x,y)=xy+(1/x)+(1/y) then fxx?fyy-fxy2 at (1,1) is
The perpendicular distance from the point (8, -5) to the y-axis is
7 unit
8 unit
18/5 unit
24/25 unit
Number of circles that can be drawn to touching all the three lines x+y-2=0,3x+4y+7=0 and 2x+2y-3=0
Bag A contains 3 white and 2 black balls. Bag B contains 2 white and 4 black balls. One bag is selected at random and a ball is drawn from it. The probability that it is white is
52/77
76/155
89/198
7/15
The nearest point on the line 2x-y+5=0 from the origin is
(2, 1)
(2,-1)
(-2, 1)
(-2, -1)
The locus of a point which is equidistant from the points(-2,2,3), (3,4,5) is
10x+4y+4z-33=0
10x-5y+2z=0
10x-5y-2z=0
10x+5y-2z=0
If tan(π/4 + θ)+tan(π/4- θ)=a then tan3 (π/4+ θ)+ tan3 (π/4- θ)=
a
3a
a3-3a
If α,β,γ are the roots of x3+x2+x+1=0 then α4+β4+γ4=
1+4+13+40+…n terms=
3n+1-2n/2n
(3n+1-2n-3)/4
3n-1+3n/9
(3n+1+2n2)/8
The excentre of the triangle formed by the points (1,2), (1,5), (5,2) which is opposite to (1,2) is
(7,8)
(4,-1)
(-1,4)
(2,3)
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 the product of the roots of the equation 5x2-4x+2+k(4x2-2x-1)=0 is 2,then k=
-8/9
8/9
4/9
-4/9
If y=x+1/(x+1/x+....∞) then dy/dx=
y/2y-x
y/x+2y
y/x-2y
y
A man has 7 relatives 4 women and 3 men.His wife also has 7 relatives 3 women and 4 men.The number of ways in which they can invite 3 men and 3 women so that they both invite three is
485
584
720
468
The vector equation of the plane passing through the point (1, -2, 5), (0, -5, -1), (-3, 5, 0) is
r=(1-s-t)(i-2j+5k)+s(-5j-k)+t(-3i+5j), s, t are scalars
r=(1-s-t)(i+2j+3k)+s(3i+2j+k)+t(2i+j+3k), s, t are scalars
r=(1-s-t)(2i+j+k)+s(i-j-k)+t(-i+j+2k), s, t are scalars
If A(2, -1) and B(6, 5) are two points the ratio in which the foot of the perpendicular from (4, 1) to AB divides it is
8:15
5:8
-5:8
-8:5
The locus of the point of intersection of tangents to the hyperbola x2-y2=a2 which includes an angle of 450 is
(x2+y2)2=4a2 (x2+y2+a2)
(x2+y2)2=4a2 (x2-y2+a2)
(x2+y2)2=4a2 (y2-x2+a2)
(x2+y2)2=4a2 (x2+y2-a2)
The circumfernce of a circle is measured as 56 cm with error 0.02 cm. the percentage error in its area is
1/7
1/14
1/56
The equation of the curve in polar coordinates is(1/r) =2sin2(θ/2).Then it represents
A straight line
a circle
a parabola
an ellipse
If α+β+γ=1,α2+β2+γ2=2 and α3+β3+γ3=3,then α5+β5+γ5=
18
36
45
If the points (k, 1), (2, -3) are conjugate w.r.t x2+y2+4x-6y-12=0 then k=
-3
2/3
5/4
If sin 7θ+sin 4θ+ sin θ=0, 0≤θ≤ π/2 then θ=
0, π/2, π, 3π/5
0, π/3, π, 2π/3
0, π/4, π/2, 2π/9
1, π/2, π, 2π/9
The locus of poles of tangents to the circle x2+y2=a2-b2 w. r. t the hyperbola x2/a2-y2/b2=1is
x2/a4+y2/b4=1/a2-b2
x2/a4-y2/b4=1/a2-b2
x2/a4+y2/b4=1/a2+b2
x2/a4-y2/b4=1/a2+b2