In a throw with a pair of symmetrical dice the probability of obtaining a doublet is
1/6
2/3
1/4
1/2
The conjugate of (1+2i) (2-3i) is
-4+i
-4-i
8
8-i
On the interval [0, 1] the function x25(1-x)75 takes its maximum value at the point
0
1/3
In order to eliminate the first degree terms from the equation 2x2 + 4xy + 5y2 - 4x - 22y + 7 = 0, the pointto which origin is to be shifted, is
(1,-3)
(2,3)
(-2,3)
(1,3)
If α,β,γ are the roots of the equation 3x3+6x2-9x+2=0,then Σ(α/β) =
12
-12
3
-3
In ΔABC, R2 (sin 2A+sin 2B+sin 2C)=
Δ
3Δ
2Δ
4Δ
sin (θ/2)sin (7θ/2)+sin(3θ/2). Sin(11θ/2)- sin 2θsin 5θ=
1
-1
2
if the points (0, 0), (2, 0), (0, 4),(1, k) are concyclic then k2-4k=
The number of common tangents that can be drawn to the circles x2+y2=1 and x2+y2-2x-6y+6=0 is
4
(cos2 330-cos2570)/(sin 210- cos 210)=
1/√2
-1/√2
-1/2
The number of ways in which the following prizes be given to a class of 20 boys, first and second in Mathematics, first and second in Physics, first in Chemistry and first in English is
204x192
203x193
202x194
none
A person standing on the bank of a river observes that the angle of elevation of the angle of elevation of the top of a tree on the opposite bank of river is 600 and when he retires 40 meters away from the tree then the angle of elevation becomes 300, the breadth of river is
20 m
30 m
40 m
60 m
If cos α+ cos β=0= sin α + sin β then cos(α - β)=
(1/1.3)+(1/3.5)+(1/5.7)+….n terms=
1/n+1
n/n+1
n/2n+1
n/3n+1
The harmonic mean of the roots of the equation (5+√2)x2-(4+√5)x+8+2√5)=0 is
6
The sum of all four digited that can be formed, using the digits 0,2,4,7,8 without repetition is
479952
497952
545958
547598
If the number of common tangents of the circles x2+y2+8x+6y+21=0, x2+y2+2y-15=0 are 2,then the point of their intersection is
(-4,-3)
(-8,-5)
(8,-5)
(8,5)
If 2x + y + a = 0 is a focal chord of the parbola y2 + 8x = 0
-4
-2
Two angles ofa triangle are Cot-1 2 and Cot-1 3.Then the third angle is
π/4
3π/4
π/6
π/3
The points (2a,4a), (2a,6a) and ((2+√3)a,5a are the vertices of an
equilateral triangle
obtuse angled triangle
isosceles triangle
acute angled triangle
The sum of the series 1+3x+5x2+7x3+....+(2n-1)xn-1+....is:
(1+x)/(1-x)
(1+x)/(1-x2)
(1+x)2/(1-x)
[(1+x)/(1-x)]2
The extremities of a diameter of a circle have coordinates (-4, -3) and (2, -1). The length of the segment cut off by the circle on y-axis is
5√13
14
3√13
√55
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
The equation whose roots are multiplied by 3 of those of 2x2+3x-1=0 is
2x2+9x-9=0
2x2-7x+6=0
2x2+5x+7=0
3x2+5x-7=0
d/dx{Tan-1√(1-cos x)/(1+cos x)}=
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 least distance of the line 8x-4y+73=0 from the circle 16x2+16y2+48x-8y-43=0 is
√5/2
2√5
3√5
4√5
If u=(ax+by)2-(x2+y2) and a2+b2=1 then uxx+uyy=
2ab
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
The angle between the circles x2+y2-4x-6y-3=0 and x2+y2+8x-4y+11=0 is
π/2
The equation of one tangent to the circle with Centre(2,-1) from the origin is 3x + y = 0, then the equation of the other tangent through the origin is
3x-y=0
x+3y=0
x-3y=0
x+2y=0
In measuring the circumfrence of a circle, there in an error of 0.05 cm. if with this error the cir cumfence of the circle is measured of the circle is measured as c cm, and then the error in area is
0.025c/π
0.01/c
0.001/c
10/c
Consider the circle x2+y2-4x-2y+c=0 whose centre is A(2, 1). If the point P(10, 7) is such that the line segment PA meets the circle in Q with PQ=5, then c=
-15
20
30
-20
The locus of poles of chords of the parabola y2=4px which touch the hyperbola x2/a2-y2/b2=1is
4p2x2+b2y2=4p2a2
4p2x2-b2y2=4p2a2
4p2x2+b2y2=4p2b2
4q2x2-b2y2=4q2a2
If cos θ=cos 5π/4, then θ=
2nπ±π/4
2nπ±3π/4
2nπ±5π/4
2nπ±7π/4
I: The modulus of √3+i/(1+i)(1+√3i) is 1/√2 II: The least positive value of n for which (1-i/1+i)n=1 is 2
only I is true
only II is true
both I and II are true
neither I nor II are true
If y= log sin x then y2=
1/cosec x
–cosec x cot x
–cosec2x
cosec2x
If u=(x-y) (y-z) (z-x) then ux+uy+uz=
u
None
x2 +4ax+3 =0 and 2x2+3ax-9 =0 have a common root, then a =
±1
If the line 3x-y =k is a hyperbola 3x2-y2=3, then k=
±√7
±√3
±√5
±√6
The radius of the sphere (r-2i+3j-k).(r+3i-j+2k)=0 is
5
5√2
5/√2
If α,β,γ are the roots of the equation x3+ax2+bx+c=0 then α-1+β-1+γ-1=
b/a
c/a
–b/c
a/c
The vectors a+2b+3c, 2a+b-2c, 3a-7c are
coplanar
collinear
non-coplanar
Order and degree of (x2+2x)y22+(x2-2)y13-2(x+3)y=0 are
2,3
2,2
3,1
3,2
If α, β are the roots of x2+ ax+b=0 and γ, δ are the roots y2+cx+d=0 then the equation of the circle having the line joining (α, γ), (β, δ) as diameter is
x2+y2+ax+cy+(b+d)=0
x2+y2+ax+cy-(a+c)=0
x2+y2-ax-cy-(b+d)=0
x2+y2+ax+by+(a+b)=0
There are three events A,B and C one of which and only one can happen. The odds are 7 to 3 against A and 6 to 4 against B.The odds against C are
3 to 7
7 to 3
4 to 3
3 to 4
If sin-1x+sin-1(1-x)=cos-1x, then x ε to
{1,0}
{-1,1}
{0,1/2}
{2,0}
If a random variable X take values 0 and 1 with respective probabilities 2/3 and 1/3 then the expected value of X is:
Circum centre of the ?le formed by the points (2, -5), (2, 7), (4, 7) is
(-2, -3)
(3, 1)
(7, 5)
If V=πr2h then rVr+2hVh=
4V
V
2V
V2
The chance of throwing an ace in the 1st only, of the two successive throws with an ordinary die is
1/36
5/36
5/6
Equation of the latusrectum of the parabola x2+8x+12y+4=0 is
y+5=0
y+1=0
y+2=0
y+3=0
The length of the line segment joining the points 2i-2j+3k, 5i+2j+3k is
If the orthocenter and the circumcentre of a triangle are (-3,5,2), (6,2,5) then its centroid is
(3,3,4)
(3/2,7/2,7/2)
(-9/2,7/2,-3/2)
(9/2, -3/2,3/2)
The number of non-zero terms in the expansion of (1+3√2x)9+(1+3√2x)9is equal to:
9
10
If the orthocenter of the angle formed by the lines 2x+3y-1=0, x+2y-1=0, ax+by-1=0 is at the origin, then (a, b) is given by
(6, 4)
(-3, 3)
(-8, 8)
(0, 7)
If f(x)=[x], g(x)=x-[x]then which of the following functions is the zero functions
(f+g)(x)
(fg)(x)
(f-g)(x)
(fog)(x)
The length of the tangent from a point on the circle x2+y2+4x-6y-12=0 to the circle x2+y2+4x-6y+4=0 is
16
If 3y2-8xy-3x2-29x+3y-18 us resolvable into two linear factors then the factors are
(x+y+4),(3x+5y+2)
(3y+x+9), (y-3x-2)
(x-y-4),(3x-5y-2)
(x+y-4),(x-2y+5)
If sinA + sinB = l, cosA - cosB = m, then the value of cos(A - B) =
(l2-m2)/(l2+m2)
(l2+m2)/(l2-m2)
2lm/(l2+m2)
2lm/(l2-m2)
If a and b are numbers between 0 and 1 such that the points z1= a+i, z2= 1+bi and z3= 0 from an equilateral triangle then a,b are
2-√3, 2-√3
2-√3, 2+√3
2+√3, 2-√3
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 normal at P cuts the axis of the parabola y2 = 4ax in G and S is the focus of the parabola.If Δ SPG is equilateral then each side is of length
A
2a
3a
4a
(a+bω+cω2)/(c+aω+bω2)=
ω
ω2
a2+b2
If the lines 3x+y+2=0, 2x-y+3=0, 2x+ay-6=0 are concurrent then a=
7
The area (in square units) bounded by the curves y2 = 4x and x2 = 4y in the plane is :
8/3
16/3
32/3
64/3
If O is the origin and if A(x1,y1), B(x2,y2) are two points then OA.OB.cos
x12+y12
x1y2+x2y1
x1y2+y1y2
x1y2-x2y1
The area bounded by the curves y=3x-x2 and y=x2-x is
4/3
If tan θ=-4/3 and θ is not in the fourth quadrant , then the value of 5 sin θ+10cos θ+ 9 secθ+16 cosec θ – 4 cot θ=
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
The quadrilateral formed by the pairs of lines x2-7x+12=0, 4x2+12xy+9y2=0,8x+12y+3=0 is
Parallelogram
Rhombus
Rectangle
Square
If f(x)= (a-xn)1/n, where a>0 and n?N, then (fof)(x)=
a
x
xn
an
If the area of an isosceles triangle is √2+1 and vertical angle is 450 then the base of the triangle is
√2
√2-1
(12/3)+(12+22/5)+(12+22+32/7)+… n terms
n(n+1)(n+2)/18
n(n+1)(n+2)/6
n(n+1)(n+2)/3
2n(n+1)(n+2)/3
If α,β and γ are roots of x3+ax2+bx+c=0,then Σα2β=
3c+ab
3c-ab
3a-bc
3a+bc
sin2 3A/ sin2A)- (cos2 3A/ cos2A)=
cos 2A
8cos 2A
1/8 cos 2A
If the tangents to the parabola y2=4ax at (x1,y1) and (x2,y2) meet on the axis then
x1=-x2
x1=2x2
y1=y2
y1=-y2
For all values of λ, the polar of the point (2λ, λ-4) with respect to the circle x2+y2-4x-6y+1=0 passes through the fixed point
(-3,-1)
(3,1)
(2,-3)
The equations whose roots are exceed by 2 than those of x4+x3-10x2+4x+24=0 is
x4-7x3+8x2+24x-16=0
x5-7x3+12x2-7x=0
x4+7x3-11x2-144x-208=0
x5+11x4+45x3+81x2+50x-6=0
The value of k such that the lines 2x -3y + k = 0,3x - 4y - 13=0 and 8x - 11y -33 = 0are concurrent, is
-7
The vector equation of the plane passing through the point 2i+2j-3k and parallel to the vectors 3i+3j-5k, i+2j+k is
r=s(2i+j-k)+t(i+2j+2k)
r=2i+2j-3k+s(3i+3j-5k)+t(i+2j+k)
r=(i+2j+3k)+s(-2i+3j+k)+t(2i-3j+4k)
10n+3.4n+2+k is divisible by 9 for all n?N. Then the least +ve integral value of k is
If the direction ratio of two lines are given by l + m + n = 0, nm - 2ln + lm = 0, then theangle between the lines is :
d/dx{(2x-3)/(3x+1)}=
7/(2x+5)2
11/(3x+1)2
41/(2x+7)2
5/(3x+5)2
The range of Sin-1 5x is
[-π/3,π/3]
[-π/2,π/2]
[-π/3,π/4]
If area bounded by the curves y2=4ax and y=mx is a2/3,then the value of m is
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
If tan2 θ=3 cosec2 θ-1 then θ=
nπ ± π/3: n ε Z
nπ + π/4: n ε Z
nπ+ (-1)nπ/6: n ε Z
nπ - π/3: n ε Z
If θ is the angle of intersection of the curves y2=x3 and y=2x2-1 at (1, 1), then tanθ=
5/14
5/12
25/12
(tan 80o - tan 10o ) / tan 70o =
The points (2k, 3k), (1, 0), (0, 1) and (0, 0) lie on a circle for
all values of k
0≤k≤1
k
k=5/13
The sum of the coefficients of even powers of x in the expansion of (1+x+x2)15 is
315+1/2
315+2/2
315-1/2
Radical centre of x2+y2-x+3y-3=0,x2+y2-2x+2y+2=0 and x2+y2+2x+3y-9=0
(-3,-2)
(3,2)
If tan (π/4 + θ)+ tan(π/4 -θ)= k sec 2θ, then the value of k is
The pole of the straight line x+4y = 4 With respect to the ellipse x2 + 4y2 = 4 is
(1, 1)
(1, 4)
(4, 1)
(4, 4)
The equation of the circle belonging to the coaxal system of which (1, 2)(4, 3) are the limiting points and passing through the origin is
2x2+2y2-x-7y=0
9x2+9y2-14x-30y+16=0
9x2+9y2-52x+46y+105=0
x2+y2+8x-2y+1=0
The foot of the normal 3x+4y=7 to the hyperbola 4x2-3y2=1 is
(1, -1)
(-1, 1)
(-1, -1)
Let Then which one of the following is true
I < 2/3 and J > 2
I < 2/3 and J < 2
I > 2/3 and J > 2
If (3+i) is a root of the equation x2+ax+b=0 then a=
-6
The polar equation of xcosα+ysinα=p is
rsin(θ+α)=p
rsin(θ-α)=p
rcos(θ+α)=p
rcos(θ-α)=p