if the points (0, 0), (2, 0), (0, 4),(1, k) are concyclic then k2-4k=
-3
0
1
-1
mCr+ mCr-1nC1+mCr-2. nC2+………..+ nCr =
(m+n)Cr
(mn)Cr
(m+n)Cr+1
(m+n)Cr-1
There are four balls of different colours and four boxes of colours same as those of the balls. The number of ways in which the balls, one each in a box could be placed such that a ball does not go to a box of its own colour is
6
9
8
24
tan (450+θ). tan (450-θ)=
2
A: If a, b, c are vectors such that [a b c]=4 then [axb bxc cxa]=64 R: [axb bxc cxa]=[a b c]2
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 R false
A is false but R is true
The angle between the straight lines 3 x2-5xy+2 y2=0 is
cos-1(4/√24)
cos-1(13/√170)
cos-1(24/√172)
cos-1(5/√26)
the equation of the parabola whose axis is parallel to x –axis and passing through (- 2,1), (1,2), (-1,3) is
5y2 + 2x – 21y + 20 = 0
15y2 + 12x – 11y + 10 = 0
18y2 – 12x + 21y + 56 = 0
25y2 – 2x -65y + 120 = 0
Observe the following statements :A : Integrating factor of (dy/dx) + y = x2 is exR :Integrating factor of (dy/dx) + P(x) y = Q(x) is e∫p(x)dx. Then the true statement among the following is
A is true, R is false
A is false, R is true
A is true, R is true, R => A
A is false, R is false
The tangents are drawn to the ellipse x2/a2+y2/b2=1 at point where it is intersected by the line lx+my+n=0. The point of intersection of tangents at these points is
(a2l/n, b2m/n)
(-a2l/n, b2m/n)
(a2l/n, -b2m/n)
(-a2l/n, -b2m/n)
f(x) = |x| has
Minimum at x=0
Maximum at x=0
Neither max nor min at x=0
None
(sin 3θ/ sin θ)-(cos 3θ/ cos θ)=
√3
√2
The transformed equation of x4+2x3-12x2+2x-1=0,by eliminating third term is
x4+6x3-12x+8=0 or x4-6x3+42x+53=0
x4+6x3-12x-8=0 or x4-6x3+42x-53=0
x3+x2+1=0 or 27x3-27x2+23=0
x3-x2+1=0 or 27x3+27x2+23=0
If b2-4ac>0,then the graph of y= ax2+bx+c
Cuts x-axis in two real points
Real and Equal
Lies entirely above the x-axis
Cannot be determined
The equation of the line whose x-intercept is 2/5 and which is parallel to 2x-3y+5=0 is
2x-5y+4=0
10x-15y-4=0
28x-21y+12=0
20x+12y+9=0
If two roots of 2x3-x2-22x-24=0 are in the ratio 3:4 then the roots are
2, 3,-1
-3/2,-2/4
-1, 1/2, 2
2 , 2,-1
Radius of the director circle of the hyperbola (x2/81) - (y2/36) = 1 is
2√5
√5
3√5
√5/2
A line segment of length 10 cm is divided into two parts and a rectangle is formed with these as adjacent sides, then the dimensions of the rectangle in order that its area is maximum is
4, 6
5, 5
2, 8
3 red and 4 white balls of different sizes are arranged in a row at random. The probability that no two balls of the same colour are together is
6/35
3/35
1/35
9/35
The value of b so that x4-3x3+5 x2-33x+b is divisible by x2-5x+6 is
45
48
51
54
if the focus is (1,-1) and the directrix is the line x + 2y – 9 = 0, the vertex of the parabola is at
(1,2)
(2,1)
(1,-2)
(2,-1)
Tan [cos-1 4/5+tan-1 2/3] =
11/6
13/6
17/6
none
The slopes of the lines passing through A(2, 0) and making an angle of 450 with the tangent at A to the circle x2 + y2 +4x-6y-12=0 is
1/3, -3
2, -1/2
-2, -1/2
1/7, -7
The eccentricity of the ellipse 25x2+9y2-150x-90y+225=0 is
3/5
4/5
2/3
1/3
The range of f(x)=10- |3-2x| is
(10, ∞)
[10, ∞)
(-∞, 10)
(-∞, 10]
The maximum value of 5 cos x+ 3 cos (x- 600)+7 is
11
13
14
17
If the product of two of 6x4-29x3+40x2-7x-12=0 is 2 then the roots are
4/3, 3/2, 1 +√2, 1-√2
- 4/3, 3/2, 1 +√2, 1-√2
4/3, - 3/2, 1 +√2, 1-√2
-4/3, - 3/2, 1 +√2, 1-√2
If α,β,γ are the roots of 2x3+3x2-6x+3=0,then the value of 1/α4+1/β4+1/γ4=
11/7
10/3
-10/3
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)
There are 5 letters and 5 addressed envelopes. If the letters are put at random in the envelopes, the probability that at least one letter may be placed in wrongly addressed envelope is
119/120
120/343
1/1155
139/140
If cosec θ-sin θ=m, sec θ-cos θ=n then (m2n)2/3+(mn2)2/3=
A tangent at a point on the circle x2+y2=a2 intersects a concentric circle S at P and Q. The tangents to S at P and Q meet on the circle x2+y2=b2. The equation to the circle S is
x2+y2=a
x2+y2=b
x2+y2=ab
x2+y2=a2+b2
If 2 tan A+cot A=tan B, then cot A+2tan(A-B)=
1/2
A tangent to y2=7x is equally inclined with the coordinate axes.Then the area of the triangle formed by the tangent with the coordinate axes is
25/16
49/32
36/25
49/36
If (2, 1 )is limiting point of the coaxal system of which x2+y2-6x-4y-3=0 is a member, then the other limiting point is
(-5, -6)
(5, 6)
(3, 5)
(-8, -13)
The equation whose roots are multiplied by 3 of those 2x3-3x2+4x-5=0 is
x3-x2+6x-8=0
x3-6x2+7x+2=0
2x3-9x2+36x-135=0
x4+3x3+4x2-28x-16=0
Cos (sin-13/5+Sin-1 5/13)=
33/65
65/33
23/65
65/23
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
a
If one of the root x4-5x3+10x2-20x+24=0 is purely imaginary then the roots are
1,-2,4,-8
±1,2,3
±2i,2,3
-3/2,-1/3,2±√3
The equation to the pair of lines joining the origin to the points of intersection of 2x+3y=1 and x2+y2=4 is
15x2+48xy+35y2=0
15x2+48xy-35y2=0
15x2-48xy+35y2=0
15x2-48xy-35y2=0
If α,β and γ are roots of x3+ax2+bx+c=0,then Σα2β=
3c+ab
3c-ab
3a-bc
3a+bc
The stability of hydrides increase from NH3 to BiH3 in group 15 of the periodic. The area of the region enclosed by the curves y = x, x = e, y =1/x and the
1/2 square units
1 square units
3/2 square units
5/2 square units
The number of four digited even numbers that can be formed from the digits 0,1,2,5,7,8 is
144
156
150
180
The number of odd numbers between 1000 and 10000 can be formed with the digits 1,2,3,4,5,6,7,8,9 is
1280
1836
2572
1680
If f(x) = 10 cos x +(13+2x) sin x then f"(x) + f(x) is equal to
cos x
4cos x
sin x
4 sin x
If tan θ + tan 2θ+ √3 tan θ tan 2θ=√3 then θ=
(nπ/3) + (π/9): n ε Z
(nπ/3) + (π/12): n ε Z
(nπ/3) + (-1)n (π/6): n ε Z
nπ +π/4: n ε Z
The solution set of sec θ=2cos θ is
{nπ ± π/3: n ε Z}
{nπ ± π/4: n ε Z}
{nπ ± π/6: n ε Z}
{nπ ± n: n ε Z}
If the circles x2+y2+2x-2y+4=0 cuts the circle x2+y2+4x-2fy+2=0 orthogonally, then f=
-2
The equation of the sphere one of whose diameter has end points (1, 2, 4) and (3, 0, 2)
x2 + y2 + z2 + 4x + 6y+ 8z + 11=0
x2 + y2 + z2 – 4x – 4y – 8z – 11 =0
x2 + y2 + z2 – 4x – 2y – 6z + 11=0
x2 + y2 + z2 – 4x – 2y +6z – 11=0
2.C0+22.C1/2+23.C3/3+……..+2n+1.Cn/n+1 =
1/n+1
4n/n+1
3n+1-1/n+1
4n+1-1/n+1
If the roots of ax3+bx2+cx+d=0 are in A.P then the roots of dx3+cx2+bx+a=0 are in
A.P
G.P
H.P
A particle moves along the curve y = x2 + 2x. Then the point on the curve such that x and y co-ordinates of the particle change with the same rate is :
(1 ,3 )
( 1/2 , 5/2 )
( -1/2 , -3/4 )
( -1 , -1 )
The chord of contact of tangents drawn from points on x2/a2+y2/b2=1 to the circle x2+ y2=c2 touches the ellipse
a2x2-b2y2=c4
a2x2+b2y2=c4
a2x2+b2y2=c2
b2x2+a2y2=c4
The roots of x5-5x4+9x3-9x2+5x-1=0 are
1,1,-2,-1/2
1,1±√3i/2, 3±√5/2
1,-1,-2,-1/2,3,1/3
2,1/2,3,1/3
The centre of the circle (1+m2)(x2+y2)-2cx-2cmy=0 is
(c/ 1+m2, cm/1+m2)
(-c/ 1+m2, cm/1+m2)
(c/ 1+m2, -cm/1+m2)
(-c/ 1+m2, -cm/1+m2)
If x ≥ y and y > 1, then the value of the expression logx (x/y) + logy (y/x) can never be
-0.5
If log 2+(1/2)log a +(1/2) log b = log(a+b),then
a = b
a = -b
a = 2,b = 0
a = 10,b = 1
If the roots of (a2+b2)x2-2b(a+c)x+(b2+c2)=0 are equal then a,b,c are in
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))
A unit vector coplanar with i+j+2k and i+2j+k and perpendar to i+j+k is
±i-j/√2
±j-k/√2
±k-i/√2
±i+j/√2
In ΔABC, (r1 +r2) (r2 +r3) (r3+r1) =
4Rs2
4Rr2
R
(1-ω+ω2) (1-ω2+ω4) (1-ω4+ω8)... to 2n factors=
22n
2n
The equation of the line parallel to 2x+3y-5=0 and forming an area 4/3sq.unit with the coordinate axes is
2x+3y±4=0
3x+2y-4=0
3x+2y±4=0
2x+3y+2=0
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
(tan 230+ tan220)/(1- tan 230 .tan220)=
If the lines 2x+y+12=0, kx-3y-10=0 are conjugate w.r.t the circle x2+y2-4x+3y-1=0, then k=
4
-9
-5
If x2-xy+y2=1 and y’’(1)=
-6
3/2
-2/3
Statement I: The points 4i+5i+k, -j-k, 3i+9j+ 4k and -4i+4j+4k are coplanar Statement II : The given points from the vertices of a parallelogram. Which of the following is true? a) Both statements are true and statement II is correct explanation of statement I b) Both statements are true and statement II is not correct explanation of statement I cv) Statement I is true and statement II is false d) Statement I is false and Statement II is true
Both statements are true and statement II is correct explanation of statement I
Both statements are true and statement II is not correct explanation of statement I
Statement I is true and statement II is false
Statement I is false and Statement II is true
The roots of the equation a(b-c) x2+b(c-a)x +c(a-b) =0 are
1, c(a-b) / a(b-c)
1, b(c-a)/a(b-c)
c(a-b) /a(b-c)
A, B, Care 3 news papers published from a city.20%of the population read A,16% read B,14% read C, 8% both A and C, 4% B and C,and2% read all the three. The percentage of then population who read at least one paper is
25%
30%
35%
40%
If sin2 mx+cos2 ny=a2 then dy/dx=
m sin (2mx)/nsin(2ny)
m cos(2mx)/nsin(2ny)
mcos(2mx)/n cos(2ny)
m sin(2mx)/n cos (2ny)
The circle on the chord x cos α+ y sin α=p of the circle x2+y2=r2 as diameter is
x2+y2-r2-2p(x cos α+ y sinα-p)=0
x2+y2-r2+2p(x cos α+ y sinα-p)=0
x2+y2-r2-p(x cos α+ y sinα-p)=0
x2+y2-r2+p(x cos α+ y sinα-p)=0
(sin 4θ)/(sin θ)=
8cos3θ-4cosθ
8sin3θ-4sinθ
4cos3θ-8cosθ
4sin3θ-8sinθ
The points i+j+k, i+2j, 2i+2j+k, 2i+3j+2k are
collinear
coplanar but not collinear
non-coplanar
A, B, C, D are four points with the position vectors a, b, c, d respectively such that (a-d). (b-c)=(b-d).(c-a)=0. The point D is the ….of ΔABC
orthocenter
centroid
incentre
circumcentre
Two equation sides of an isosceles triangle are 7x-y+3=0, x+y-3=0 and its third side passes through the point (1, -10). The equation of the third side is
3x+y+7=0
x-3y+29=0
3x+y+3=0
3x+y-3=0
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
If tan θ+ tan 2θ+tan 3θ= 0 then θ=
nπ/3: n ε Z or nπ±tan-1(1/√2): n ε Z
nπ/3+ (-1)nπ/6: n ε Z
2nπ/3 ± π/9: n ε Z
(4n+1)π/12: n ε Z
Let ABC be a triangle. If P is point such that APdivides BC in the ratio 2:3, BP divides CA in the ratio 3:5 then the ratio in which CP divides AB is
2:5
2: -5
5:2
5: -2
The polar of the point(2t, t-4) w.r.t the circle x2+y2-4x-6y+1=0 passes through the point
(1, 2)
(1, 3)
(2, 1)
(3, 1)
3x-5x2+12 has maximum at x=
2/5
-2/5
3/10
-3/10
If 1,ω,ω2 are the cube roots of unity, then (a+bω+cω2)/ (c+aω+bω2) is equal to:
ω
ω2
ω3
If the equation of the circle passing through the origin and the points of intersection of the two circles x2+y2-4x-6y-3=0, x2+y2+4x-2y-4=0 is x2+y2+2ax+2by+c=0 then the ascending order of a, b,c is
a, b, c
b, c, a
c, a, b
a, c, b
The harmonic mean of the roots of the equation (5+√2)x2-(4+√5)x+8+2√5)=0 is
If tan θ= (cos 120+ sin 120)/ (cos 120- sin 120) then θ=
540
570
600
190
The number of real solutions of Tan1 x+Tan 1 (1/y) = Tan1 3 is
(1,4)
(4,13)
none of these
The equation of the line having intercepts a,b on the axes such that a+b =5, ab=6 is
x+y=5
3x+2y-6=0, 2x+3y-6=0
x-3y-3=0,3x-y+3=0
2x+10y-5=0,10x+2y-5=0
If sin-1x+sin-1(1-x)=cos-1x, then x ε to
{1,0}
{-1,1}
{0,1/2}
{2,0}
sin 200.sin 400.sin 600 sin800=
1/16
3/16
1/32
1/8
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 equation of the tangent to the curve 2x2-xy+3y2=18 at (3, 1) is
11x+3y-36=0
11x-3y+36=0
3x+11y-2=0
3x-11y+2=0
tan 700-tan 200
tan 500
2 tan 500
tan 600
2 tan 600
E1: a + b + c = 0 if 1 is a root of ax2 + bx + c = 0E2: b2 - a2 = 2ac if sinθ, cosθ are the roots of ax2 + bx + c = 0Which of the following is true
E1 is true, E2 is true
E1 is true, E2 is false
E1 is false, E2 is true
E1 is false, E2 is false
The points (4, -2), (3, b) are conjugate w.r.t x2+y2=24 if b=
12
-4
5 boys and 3 girls sit in a row at random. If a is the probability that all the girls sit together, b is the probability that all the boys sit together and c is the probability that all the boys and all the girls sit together then the ascending order a,b,c is
a,b,c
b,c,a
c,a,b
b,a,c
4(cos3 200 +cos34 00) =
3(cos 200+cos 400)
3(cos 100+sin 200)
3(cos 200+sin 400)
3(cos 100+cos 200)
The side of an equilateral triangle increases at the uniform rate 0.05 cm/sec. the rate of increase in the area of the triangle when the side is 20 cm is
3sq.cm/sec
√3/2sq.cm/sec
1.2sq.cm/sec
4πsq.cm/sec
If (cos 3α+i sin 3α)(cos 5β+i sin 5β)= cos θ+i sin θ then θ is
2α+3β
3α+6β
3α+5β
2α+4β
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
If α,β,γ are the roots of x3+qx+r=0 then the equation whose roots βγ+1/α,γα+1/β,αβ+1/γ is
x3-q2x2-2qr2x-r4=0
rx3+q(1-r)x2+ (1-r)3=0
x3-2qx2+q2x+r2=0
r2x3+3r2x2+ (3r2+q3) x + 2q3+r2=0
Equation of the directrix of the parabola y2=5x – 4y – 9 is
2x + 1 =0
4x + 1=0
6x + 1=0
4x – 1=0