If the pairs of lines x2-2pxy-y2=0 and x2-4xy-y2=0 be such that each pair bisects the angle between the other pair, then p=
-1/2
1/2
1/3
-1/3
If the lines x+ky+3=0 and 2x-5y+7=0 intersects the coordinates axes in concyclic points then k =
-2/5
-3/5
3/2
-5/3
. I: The equation to the pair of lines passing through the point (2,-1) and parallel to the pair of lines 3x2-5xy+2y2-17x+14y+24=0. II: The equation to the pair of lines passing through (1,-1) and perpendicular to the pair of lines x2-xy-2y2=0 is 2x2-xy-y2-5x-y+2=0.
only I is true
only II is true
both I and II are true
neither I nor II are true
If the coefficient of rth term and (r + l)th term in the expansion of (1 + x)20 are in the ratio 1 : 2, then r is equal to:
6
7
8
9
If the roots of 24x3-26x2+9x-1=0 are in H.P then the roots are
1/2, 1/3, 1/4
1,1/3,1/5
1, 0, -2
1, 1, -2
The portion of a line intercepted between the coordinate axes is bisected by the point (2, -1) in the ratio 3:2. The equation of the line is
5x-2y-20=0
2x-y+7=0
x-3y-5=0
2x+y-4=0
A cylindrical vessel of radius 0.5mts. is filled with oil at the rate of 0.25 π.c mts./minute. The rate, at which the surface of oil is increasing is
1mts./min
2 mts./min
5 mts./min
1.25 mts./min
If the tangent to the circle x2+y2=5 at (1, -2) also touches the circle x2+y2-8x+6y+20=0, then the point of contact is
(1, 0)
(3, -1)
(5, 2)
(-1, 0)
A curve passes through the point (2, 0) and the slope of the tangent at any point is x2-2x for all values of x. The point of maximum or donation the curve is
(0, 2/3)
(0, 4/3)
(0, 1/3)
(0, 5/3)
The function f(x)=a sin x+1/3x has maximum value at x =π/3. The value of a is
3
2
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
1
4/3
(sin θ+ cosec θ)2+(cos θ+ sec θ)2 =
tan2 θ+ cot2 θ+7
sin2 θ+ cos2 θ+7
sec2 θ+ cosec2 θ+7
cos2 θ+ cot2 θ+7
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
If f(x) is a polynomial of degree n with rational coefficients and 1+2i, 2-√3 and 5 are three roots of f(x) = 0, then the least value of n is :
5
4
If the roots of (c2-ab)x2-2(a2-bc)x+(b2-ac)=0 are equal,then
a3+b3+c3=3abc or a=0
a2+b2+c2=ab+bc+ca
abc=a+b+c
a=b=c
The distances travelled by a particle in time t is given by s=t3-2t2-3t+5. The velocity of the partial when t=2 sec. is
1 unit/sec
2unit/sec
1/2unit/sec
3unit/sec
An aircraft gun can take a maximum of three shots at an enemy plane moving away from it. The probabilities of hitting the plane at the first, second and third shot are 0.5,0.4,0.3 respectively. The probability that the gun hits the place is
0.79
0.488
0.6976
0.784
The length of the direct common tangent of the circles x2+y2-4x-10y+28=0 and x2+y2+4x-6y+4=0 is
16
√20
If 1,α1,α2,....,αn-1 are the roots of xn-1=0 then(1-α1)(1-α2)...(1-αn-1)=
n
0
-1
If Tan A+ Tan B=p and Cot A+ cot B= q then cot (A+B)=
p-q/pq
q-p/pq
pq/p+q
pq/p-q
If α,β,γ,δ are the roots of x4-x3-7x2+x+6=0 then α4+β4+γ4+δ4=
79
89
99
109
The values of x for which 2x3-3x2-36x+10 has extreme values are
R
-2, 3
(2/3, ∞)
(-∞), -2) (6, ∞)
Four numbers are chosen at random from {1, 2, 3, .... 40}. The probability that they are not consecutive, is
1/2470
4/7969
2469/2470
7965/7969
If u=x2+y2+z2,x=et,y=et sin t,z=et cos t then du/dt=
e2t
4e2t
u
None
The approximate change in y, when y=x2+2x, x=3, δx=0.01 is
3.6
0.08
0.3
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
If x= sin t cos 2t, y= cos t sin 2t then (dy/dx)t=π/4
-2
The line y = m(x + a)+a/m touch the parabola y2= 4a(x+ a) form
Is equal to 0
Is any positive real number
Is any negative number
Is any real number
The number of ways in which 5 red balls and 4 black balls of different sizes can be arranged in a row so that two balls of the same colour come together is
2880
3240
4420
5230
(1.02)6 + (0.98)6 =
2.002
2.102
2.012
2.210
The number of common tangents to the two circles x2+y2-x=0, x2+y2+x=0 is
sin A+sin 5A+sin 9A)/(cos A+ cos 5A+ cos 9A)=
tan 2A
tan 3A
tan 4A
tan 5A
The image of the point (4, -13) with respect to the line 5x + y + 6 = 0 is
(-1, -14)
(3, 4)
(1, 2)
(-4, 13)
If the product of the roots of x3+kx2-3x+4=0 may be -1 then k=
7/2
9/2
-7/2
-9/2
The shortest distance from (-2, 14) to the circles x2+y2-6x-4y-12=0 is
The locus of the centre of a circle which cuts the circles 2x2+2y2-x-7=0 and 4x2+4y2-3x-y=0 orthogonally is a straight line whose slope is
-5/2
A:The area of the triangle formed by the two rays whose combined equation is y=|x| and the line x+2y=2 is 3/4 R: The area of the triangle formed by the lines ax2+2hxy+by2=0,lx+my+n=0 is (n√h2-ab)/(|am2-2nlm+bl2|)
Both A and R are true and R is the correct explanation of A.
Both A and R are true and R is not correct explanation of A
A is true but R is false
A is false but R is false
The solution of y2 dx+(3xy-1)dy=0 is
xy3=y2+c
xy3=y2/2+c
xy3=y2/3+c
xy3=x2/2+c
If the points (3,2,-4) ,(5,4,k), (9,8,-10) are collinear then k=
-3
A box contains 10 mangoes out of which 4 are rotten. Two mangoes are taken out together. If one of them is found to be good, the probability that the other is also good is
8/15
5/13
The equation of the circle cutting orthogonally circles x2+y2-4x+3y-1=0 and passing through the points (-2, 5), (0, 0) is
2x2+2y2-11x-16y=0
x2+y2-4x-4y=0
x2+y2-16x-8=0
4x2+4y2-15x-4=0
The parabola with directrix x + 2y -1 =0 and focus (1,00) is
4x2 – 4xy + y2 – 8x + 4y + 4=0
4x2 + 4xy + y2 – 8x + 4y + 4=0
4x2 + 4xy + y2 +8x – 4y + 4=0
4x2 – 4xy + y2 – 8x – 4y + 4=0
If one root of 24x3-14x2-63x+45=0 is the double the other then the roots are
-1,1/2,2
2,2,-1
3/4,3/2,-5/3
-3/2,-3/4,1/3
The locus of the point z = x + iy satisfying | (z-2i) / (z+2i) | = 1 is
X-axis
Y-axis
y = 2
x = 2
If 1,2,3,4 are the roots of the equation x4+ax3+bx2+cx+d=0 then a+2b+c=
-25
10
24
If a= sin θ+ cos θ, b= sin3 θ+ cos3θ then
a3-3a+2b=0
a3+3a+2b=0
a3+3a-2b=0
The function y=f(x) satisfying the condition f(x+1/x)=x3+1/x3 is
f(x)=x2
f(x)=x2-2
f(x)=x2+2
f(x)=x3-3x
If A+B+C= 2S, then cos2 S+ cos2 (S-A)+ cos2 (S-B)+ cos2 (S-C)=
2 sin A cos B sin C
4 cos A/2 cos B/2 cos C/2
2+ 2 cos A cos B cos C
sin A sin B
If the acute angle between the lines 2x+3y-5=0, 5x+ky-6=0 is then the value of k is
The condition that the circles x2+y2+2ax+2by+c=0, x2+y2+2bx+2ay+c=0 to touch each other is
(a+b)2=c
(a+b)2=2c
(a-b)2=c
(a-b)2=2c
3 integers are chosen at random without replacement from the first 20 integers. The probability that the product is odd is
17/19
2/19
10C2/ 20C2
none
If there is a possible error of 0.02 cm in the measurement of the diameter of a spare then the possible percentage error in its volume when the radius 10 cm is
0.1
0.2
0.4
If sinh 9- k sinh k=(k+1)sinh3 k,then k=
noneof these
If the middle term of (1+x)2n is 1.3.5...(2n-1)k/n! then k=
(3x)n+1
(2x)n+1
(2x)n
(3x)n
If the line x + y + 2 = 0 touches the parabola y2 = kx, then k =
If y = sin (logex) then x2 (d2y/dx2) + x (dy/dx) =
sin (logex)
cos (logex)
y2
- y
If (a+ib)2= x+iy then x2+y2=
(a2+b2)2
(a2-b2)2
Four tickets marked 00,01,11 respectively are placed in a bag. A ticket is drawn at random 5 times being replaced each time. The probability that the sum of the numbers on the tickets is 22 is
2/7
25/256
231/256
The roots of x4-12x3+34x2-12x+1=0 are
2±√3, 3±2√2
2±√3,4±√15
-1,-2,-1/2,√3±√5/2
2,1/2,3,1/3
15 buses fly between Hyderabad and tirupathi. The number of ways can a man go to Tirupathi from Hyderabad by a bus and return by a different bus is
15
150
210
225
From an urn containing 3 white and 5 black balls , 4 balls are transfered in to an empty urn. From this urn a ball is drawn and found to be white. The probability that out of four balls transfered 3 are white and 1 is black is
3/4
1/7
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)
The domain of log10 (x3-x) is
(-1, 0) U (1, ∞)
(-∞, -1) U (1, ∞)
(-∞, 0) U (1, ∞)
(-∞, -1) U (0, ∞)
The two circles x2+y2=a2, x2+y2=c2(c>0) touch each other if
a=2c a) a=2c b) |a|=2c c) 2|a|=c d) |a|=c
|a|=2c
2|a|=c
|a|=c
The equation of the normal to the curve 3y2=4x+1 at (1, 2) is
3x+y+5=0
3x+y-5=0
3x-y+5=0
3x-y-5=0
If α,β,γ are the roots of the equation x3+px2+qx+r = 0 then the coefficient of x in the cubic equation whose roots are α(β+γ), β(γ+α) and γ(α+β) is
2q
q2+pr
p2- r
r(pq - r)
tan θ+ 2 tan 2θ+4 tan 4θ+ 8 tan 8θ+16 tan 16θ+32 cot 32θ=
sin θ
cos θ
tan θ
cot θ
sin4 π/8+ sin4 3π/8+ sin4 5π/8+ sin4 7π/8=
1/4
3/8
If O(0,0), A(3,4), B(4,3) are the vertices of a triangle then the length of the altitude from O is
4√2
7√2
7/√2
7/2√2
If the lines x2+(2+h)xy-4y2=0 are equally inclined to the coordinate axes then h=
-4
-8
The point on the curve x2+y2-2x-3=0 at which the tangent is parallel to x-axis is
(1, 0), (-1, -4)
(0, -1), (-2, 3)
(2, 13), (-2, -3)
(1, 2), (1, -2)
d/dx{(√(a2+x2)+ √(a2-x2))/ (√(a2+x2)- √(a2-x2))}
(2a2/x2){1+a2/√(a4-x4)}
(2a2/x3){1+a2/√(a4-x4)}
1+a2/√(a4-x4)
1-a2/√(a4+x4)
x2n-1+y2n-1 is divisible by x+y if n is
a positive integer
an even positive integer
an odd positive integer
If the rate of change of the side of a square is 0.05 cm/sec, then the rate of change in the area of the square when the side is 10 cm is
0.5sq.cm/sec
1sq.cm/sec
5sq.cm/sec
10sq.cm/sec
If A,B are acute angles, tan A=5/12, cos B=3/5, then cos (A+B)=
16/65
65/16
65/63
56/65
128 sin8 θ=
cos 8θ+8cos 6θ+28cos 4θ+56cos 2θ+35
cos 8θ+8cos 6θ-28cos 4θ+56cos 2θ+35
cos 8θ-8cos 6θ+28cos 4θ-56cos 2θ+35
cos 8θ+8cos 6θ-28cos 4θ-56cos 2θ+35
If the 2nd term in the expansion (13√a+a/√a-1) is 14a5/2, then the value of nC3/nC2 is
12
If cos θ= cos α- cos β/ (1-cos α cos β) then tan2(θ/2)tan2(β/2)=
tan α/2
tan2 α/2
cot α/2
cot2α/2
If the 5th term is 24 times the 3rd term in the expansion of (1+x)11 then x=
±4
±2
±3
±8
Let AB be the chord 4x-3y +5 = 0 with respect to the circle x2+y2-2x+4y-20=0. If C= (7, 1), then the area of the triangle ABC is
15 sq. unit
20 sq. unit
24 sq. unit
45 sq .unit
Equation of the tangent to the circle x2+y2=3, which is include at 600 with the x-axis is
y=√3x+2√3
y√3=x+2√3
y=-x√3+4√3
Sin-1(sin 2π/3) =
π/12
π/3
3π/4
π/6
The sum of the fifth powers of the roots of the equation x4-3x3+5x2-12x+4=0 is
123
36
149
795
The condition that the two spheres a(x2 + y2 + z2)=k2 may cut orthogonally (k ≠0)
bp=ak2
bk2 = ap
(k2/p)-(-p/a)
a = p2bk
If α,β,γ are the roots of the equation 3x3+6x2-9x+2=0,then Σ(α/β) =
-12
5 different engineering, 4 different mathematics and 2 different chemistry books are placed in a shelf at random. The probability that the books of each kind are all together is
∠5∠4∠2 /∠11
∠3∠5∠4∠2 /∠11
∠5∠6 /∠11
3!5!4! / 11!
The equation of the chord of the ellipse 2x2+3y2=6 having (1, -1) as its midpoint is
8x+9y-25=0
2x-3y-5=0
x+y-1=0
3x-2y-6=0
2 cosh 3 cosh 5=
cosh 2
cosh 8- cosh 2
cosh 15
cosh 8+ cosh 2
If x2y-x3(dy/dx)=y4cosx then x3y is equal to
sin x
2 sin x + c
-3 sin x + c
3 cos x +c
The radius of the circle passing through the point (6, 2) and two of whose diameters are x+y=6 and x+2y=4 is
2√5
The displacement of a body of mass 100kg in a rectilinear motion is given by the formula s=2t2+3t+1. The K.E of the body 5 sec after the start is
56000
26450
20000
If the range of the random variable X is from a to b, a < b F(X < a)=
0.5
If 1,-1,2 are the roots of x3+Ax2+Bx+C=0 then the ascending order of A,B,C is
A,B,C
B,A,C
C,B,A
C,A,B
If Cot-1 4/3+Cot-1 5/3= Tan-1 k, then k=
29/27
-29/27
27/11
-27/29
Minimum value of cos x+ sin x is obtained at
π/4
π/2
5π/4
If A, B, C are the maximum heights reached when three stones projected vertically upwards moves according to the law s= 60t-5t3, s=6t-1/2t2, s=10t-7t3 respectively then the ascending order of A,B,C is
A, B, C
C, B, A
B, A, C
B, C, A
If y= ax2+b/x then x2y2=
y
2y
If 2x+ky-10=0, 5x+2y-7=0 are parallel, then the value of k =
4/5
5/3
If √2 and 3i are the two roots of a biquadratic equation with rational coefficients,then its equation is
x4+7x2+18=0
x4+7x2-18=0
x4-7x2+18=0
x4-7x2-18=0
The quadrilateral formed by the lines x-y+2=0, x+y=0, x-y-4=0, x+y-12=0 is
Parallelogram
Rectangle
Rhombus
Square