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
If θ= Sin-1 x+ Cos-1 x+ Tan-1 x, 0≤x≤1, then the smallest interval in which θ lies is given by
π/4 ≤ θ ≤π/2
- π/4 ≤ θ ≤0
0≤ θ ≤ π/4
π/2 ≤ θ ≤3π/4
If cos 2x = (√2 + 1)(cos x - 1/√2) , cos x ≠ 1/2 then x belongs to
{2nπ ± π/6 : n Є Z }
{2nπ ±π/3 : n Є Z }
{2nπ ±π/2 : n Є Z }
{2nπ ± π/4 : n Є Z }
cos4 π/8+ cos4 3π/8+ cos4 5π/8+ cos4 7π/8=
1/4
3/2
3/4
3/8
The number of ways that all the letters of the word SWORD can be arranged such that no letter is in its original position is
44
32
28
20
Let f(x)=-2sinx, if x≤-π/2; f(x)=a sinx+b,if –π/2
a=0, b=1
a=1,b=1
a=-1,b=0
a=-1,b=1
If f(x,y)=xy+(1/x)+(1/y) then fxx?fyy-fxy2 at (1,1) is
4
0
1
3
cos(π/4+A) cos(π/4-B)+ sin(π/4+A) sin(π/4-B)=
cos(A+B)
cos(A-B)
sin(A+B)
sin(A-B)
Mr. A is called for 3 interviews .There are 5 candidates at the first interview, 4 at the second and 6 at the third .If the selection of each candidates is equally likely then the probability that A will be selected for at least one post is
1/2
1/3
1/9
If (1,2) is the midpoint of a chord of the circle (x-2)2+(y-4)2=10 and the equation of the chord is ax+by+c=0(a>0) then a-b+c=
2
-2
-6
6
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
A bag A contains 2 white and 3 red balls and a bag B contains 4 white and 5 red balls. One ball is drawn at random from one of the bags and is found to be red. The probability that it was drawn from bag B is
23/54
25/51
25/52
27/55
The polar of given point with respect to any one of the circles x2+y2-2kx+c2=0, (k is a variable) always passes through a fixed point whatever be the value of k is
(x1, x12-c2/y1)
(-x1, x12-c2/y1)
(x1, -x12-c2/y1)
(-x1, -x12-c2/y1)
If y=4x-5 is a tangent to the curve y2=px3+q at (2, 3), then
p=2, q=-7
p=-2, q=7
p=-2, q=-7
p=2, q=7
If ΔABC is right angled at A, then r2 + r3 is equal to
r1-r
r1+r
r-r1
R
If tan-13 + tan-1n= tan-18, then n is equal to
5
1/5
5/14
14/5
The area of the parallelogram whose diagonals are i-3j+2k, -i+2j is
4√29 sq.unit
1/2 √21 sq.unit
10√3 sq.unit
1/2√270 sq.unit
Equation of the circle passing through (0,0),(a,b) and (b,a) is
(a+b)(x2+y2)-(a2+b2)(x+y)=0
(a+b)(x2+y2)-(a+b)(x+y)=0
(a+b)(x2+y2)+(a2+b2)(x+y)=0
(a2+b2)(x2+y2)+(a+b)(x+y)=0
If (1,2,3), (2,3,1) are two vertices of an equilateral triangle then its third vertex is
(3,1,2)
(3,-1,2)
(-3,1,2)
(-3,-1,2)
sin 850-sin 350- cos 650
The equations of the tangents to the hyperbola 2x2-3y2=6 which are perpendicular to the line x-2y+5 =0 are
x-2y±√11=0
2x+y±√0=0
x+5y±√21=0
x+6y±√31=0
The locus of midpoints of the chord of the circle x2+y2 = 25 which pass through a fixed point (4, 6) is a circle. The radius of that circle is
√52
√2
√13
√10
If A,B,C are collinear points such that A=(3,4), B=(7,7) and AC=10 then C=
(5,2)
(5,-2)
(-5,2)
(-5,-2)
If b + c = 3a, then cot B/2 cot C/2 is equal to :
The equation of the circle whose center lies on the X- axis and which passes through the points (0, 1) (1, 1) is
x2 + y2 -y+1=0
x2 + y2 - x+1=0
x2 + y2 - 2x=1
2x2 + 2y2 - x-=3
If a= sin θ+ cos θ, b= sin3 θ+ cos3θ then
a3-3a+2b=0
a3+3a+2b=0
a3+3a-2b=0
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 f(x)= (a-xn)1/n, where a>0 and n?N, then (fof)(x)=
a
x
xn
an
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
If the equation x2-2mx+7m-12=0 has equal roots then m=
2 or 3
3 or 4
4 or 5
5 or 6
If the circles x2+y2+2x-2y+4=0 cuts the circle x2+y2+4x-2fy+2=0 orthogonally, then f=
-1
The height of a hill is 3300 mt. From a point P on the ground the angle of elevation of the top of elevation of the top of the hill is 600. A balloon is moving with constant speed vertically upwards from P. After 5 minutes of its movement, a person sitting in it observes the angle of elevation of the top of the hill is 300. What is speed of the balloon?
15.3 kmph
24.5 kmph
26.4 kmph
32.3 kmph
The vector r satisfying the conditions that i) it is perpendicular to 3i+2i+2k and 18i-22j-5k ii) it makes an obtuse angle with y-axis, iii)|r|=14 is
2(-2i-3i+6k)
2(2i-3i+6k)
4i+ 6j-12k
none
If the 3rd, 4th and 5th terms of (x+a)n are 720, 1080 and 810 respectively then (x,a,n)=
(2,3,5)
(3,5,7)
(5,3,2)
(2,5,3)
If x2+y2-4x+6y+c=0 represents a circle radius 5 then c=
-12
-3
(l1,m1,n1) and (l2,m2,n2) are D’rs of two lines inclined at an angle 1200 then D.C’s of the line bisecting the angle between them are
(l1+l2,m1+m2,n1+n2)
(l1+l2/3, m1+m2/3,n1+n2/3)
(l1+l2/√2, m1+m2/√2,n1+n2/√2)
(l1+l2/√3, m1+m2/√3,n1+n2/√3)
A(-1, 1) B(5, 3) are opposite vertices of a square. The equation of the other diagonal (not passing through A, B) of the square is
2x-3y+4=0
2x-y+3=0
y-3x-8=0
x+2y-1=0
If A+B+C+D= 2π, then -4 cos (A+B/2) sin (A+C/2) cos (A-D/2)=
sin A+ sin B+ sin C- sin D
sin A- sin B+ sin C- sin D
sin A+ sin B+sin C+ sin D
sin A- sin B+ sin c+ sin D
If the roots of the equation ax2+bx+c=0 is of the form k+1/k and k+2/k+1(k≠0),then (a+b+c)2 is equal to
2b2-ac
b2+4ac
b2-4ac
b2-2ac
The tangent and normal to the ellipse 4x2+9y2 =36 at a point P on it meets the major axis in Q nd R respectively. If QR=4, then the eccentric angle of P is
Cos-1 3/5
Cos-1 2/3
Cos-1 1/3
Cos-1 1/5
(tan 230+ tan220)/(1- tan 230 .tan220)=
The quadrilateral formed by the pairs of lines 6x2-5xy-6y2=0, 6x2-5xy-6y2+x+5y-1=0 is
Parallelogram
Rhombus
Rectangle
Square
An observer finds that the angular elevation of a tower is θ. On advancing ‘a’ metres towards the tower, the elevation is 450 and on advancing b metres the elevation is 900-θ. The height of the tower is
ab/(a+b)metres
ab/(a-b)
(a-b)/ab
(a+b)/ab
If 2,-2,4 are the roots of ax3+bx2+cx+d=0 then the roots of 8ax3+4bx2+2cx+d=0 are
2,-2,4
1/2,-1/2,1/4
1,-1,2
4,-4,8
2 cos 540. Sin 660=
√3/2+ sin120
√3/2-sin120
√3/2+ cos 120
√3/2-cos 120
Cos23π/5 + Cos24π/5 is equal to
4/5
5/2
5/4
If the circle x2 + y2 + 2x + 3y + 1 = 0 cuts another circle x2+y2 + 4x + 3y + 2 = 0 in A and B, then the equation of the circle with AB as a diameter is :
x2 + y2 + x + 3y + 3 = 0
2x2 +2y2 + 2x + 6y + 1 = 0
x2 + y2 +x +6y + 1 = 0
2x2 + 2y2 + x + 3y +1 = 0
sin A+sin 5A+sin 9A)/(cos A+ cos 5A+ cos 9A)=
tan 2A
tan 3A
tan 4A
tan 5A
The multiplicative inverse of (4+3i) is
4/25+(3/25)i
4/25-(3/25)i
-4/25+(3/25)i
-4/25-(3/25)i
If (1, 2),(4, 3),(6, 4) are the midpoints of the sides BC,CA,AB of Δ ABC, then the equation of AB is
2x-3y-13=0
2x+3y-1=0
x-3y+6=0
x+3y+12=0
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)
y-axis divides the line segment joining (3,5), (-4,7) in the ratio
1:2
3:7
4:5
3:4
d/dx{1-cos 2x/3+2 sin 2x}=
2(2+3 sin 2x+2 cos 2x)/(3+2 sin 2x)2
2(2+3 sin 2x-2 cos 2x)/(3+2 sin 2x)2
2(2-3 sin 2x+2 cos 2x)/(3+2 sin 2x)2
2(2-3 sin 2x-2 cos 2x)/(3+2 sin 2x)2
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 straight line x + y = k touches the parabola y = x-x2, if k =
The intersection of the sphere x2+y2+z2-3x+3y+4z=8 is the same as the intersection of one of the sphere and the plane
2x-y-z=1
x-y-z=1
x-2y-z=1
x-2y-2z=1
The cosine of the angle A of the triangle with vertices A(l, -1, 2), B(6,11, 2),C(1, 2, 6)is
63/65
36/65
16/65
13/64
The minimum value of sin6 x+ cos6 x is
Angle between the tangents to the curve y=x2-5x+6 at the points (2, 0) and (3, 0) is
π/6
π/4
π/3
π/2
The common chord of x2+y2-4x-4y=0 and x2+y2=16 substends at the origin an angle equal to
The vector equation of the plane passing through A and perpendicular to AB where 3i+j+2k, i-2j-4k are the position vectors of A, B respectively
[r-(2i-j-4k)].( 4i-12j-3k)=0
[r-(3i-2j+k)].( 4i+7j+4k)=0
[r-(2i+j-4k)].( 4i-12j+3k)=0
[r-(3i-2j+k)].( 4i+7j-4k)=0
The length of the common chord of the circles x2+y2+2hx=0, x2+y2-2ky=0 is
k/h2+k2
hk/√h2+k2
2hk/h2+k2
2hk/√h2+k2
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
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
If the point of intersection of kx+4y+2=0, x-3y+5=0 lies on 2x+7y-3=0, then k=
Let an=10n / n! for n=1,2,3.................. Then the greatest value of n for which an is the greatest is
11
10
8
The extremities of a diagonal of a parallelogram are the points (3,-4) and (-6,5). If the third vertex is (-2,1) then the fourth vertex is
(1,0)
(-1,0)
(1,1)
(-1,-1)
If x2+y2=a2 then dy/dx=
x/y
–y/x
–x/y
y/x
The product of the slopes of the tangents to the ellipse 2x2+3y2=6 draw from the point (1, 2) is
P and Q are two points on the line x-y+1=0. If OP=OQ=6 then length of median of Δ OPQ through O is
1/√2
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
The 1st and 2nd points of trisection of the join of (-2, 11), (-5, 2) are
(-3, 8), (-4, 6)
(-3, 9), (-4, 5)
(-3, 8), (-4, 5)
(-3, -4), (8, -5)
If A2 = A, B2 = B, AB = BA = O then (A+B)2 =
A2–B2
A+B
AB
If P is a point on the parabola y2 = 4ax such that the subtangent and subnormal at P are equal, then the coridinate of P are
(a,2a) or (a,-2a)
(2a,2√2a) or (2 - ,2√2A)
(4a,-4a) or (4a,4a)
None
The radical centre of the circle x2+y2=1, x2+y2-2x=1, x2+y2-2y=1 is
(0, 0)
(1, 0)
(0, 1)
If ω is a complex cube root of unity then ( 1 - ω + ω2)6 + ( 1- ω2 + ω)6 =
64
128
(4/1.3)-(6/2.4)+(12/5.7)-(14/6.8)+…….=
loge(2/e)
loge(e/2)
loge2
If a denotes the number of permutations of x+2 things taken all at a time, b the number of permutations of x-11 things taken all at a time such that a=182bc, then the value of x is
15
12
18
2+ 5/(2!.3)+5.7/(3!.3)+5.7/(3!.32 )+...........∞=
3√3-2
1/3(√3-2)
1/3(3√3-2)
3√3-1
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
In a ∆ ABC, (a-b)2cos2(C/2)+(a+b)2sin2(C/2) is equal to
a2
c2
b2
a2+b2
The perpendicular distance of radical axis determined by the circles x2 + y2 + 2x + 4y – 7 =0 and x2 + y2 – 6x + 2y – 5 =0 from the origin is:
1/√17
2/17
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)
If the quadratic equations ax2+2cx+b=0 and ax2+2bx+c=0, (b ≠ c) have a common root then a+4b+4c =
The circumcentre of the triangle with vertices at A(5, 12),B(12, 5), c (2√(13 ) ,3√(13 )) is
(0. 0)
If the circles x2+y2-4x+6y+8=0, x2+y2-10x-6y+14=0 touch each other , then the point of contact is
(3, -1)
(7, 5)
(-7, -5)
The solution of (12x+5y-9)dx+(5x+2y-4)dy=0 is
6x2+5xy+y2+9x+4y=c
6x2+5xy+y2-9x-4y=c
6x2-5xy-y2-9x-4y=c
3x2+5xy+2y2-9x-4y=c
The circle x2+y2-2x+5y-24=0 cuts the x-axis at A and B and Y-axis at C and D then AB+CD=
4√5
21
2√5
A stone thrown upwards, has its equation of motion s=490t-4.9t2. Then the maximum height reached by it is
24500
12500
12250
25400
The slope of a stright line passing through A(5, 4) is -5/12.The points on the line that are 13 unit away from A are
(-8, 11) (4, -5)
(-7, 9), (17, -1)
(7, 5), (-1, -1)
(6,10), (3,5)
Tangents OA and OB are drawn to the circle x2+y2+gx+fy+c=0 from O(0,0). The equation of the circum circle of the ?OAB is
2x2+2y2+gx+fy=0
2x2+2y2-gx-fy=0
x2+y2+gx+fy=0
x2+y2-gx-fy=0
Two equal sides of an isosceles triangle are given by equation 7x-y+3=0 and x+y-3=0 and its third side passes through the point (1, 0).The equation of the third side is
3x+y+7=0
x-3y+29=0
3x+y+3=0
3x+y-3=0
tan 2030+tan 220+tan 2030 tan 220 =
The solution set of x2>4x-5 is
(-∞,1-√2][1+√2,∞)
(-1,1/2)
[-1,1/2]
The differential equation obtained by eliminating the arbitrary constants a and b from xy=aex + be-x is
x d2y/dx2 +2 dy/dx -xy =0
d2y/dx2 +2y dy/dx -xy =0
x d2y/dx2 +2 dy/dx +xy =0
d2y/dx2 + dy/dx -xy =0
I: The circum centre of the triangle with vertices (1, √3), (1, √2), (3, -√3) is (2, 0). II: The ortho-centre of the triangle formed by the lines 4x-7y+10=0, x+y=5, 7x+4y=15 is (1, 2)
Only I is true
Only II is true
Both I and II are true
Neither I nor II are true
If tan θ+sin θ=m ,tan θ- sin θ=n then (m2-n2)2
16mn
4mn
32mn
8mn
The equation to one asymptote of the hyperbola 14x2+38xy+20y2+x-7y-91=0 is 7x+5y-3=0, then the other asymptote is
2x+4y=1
2x-4y=1
2x+4y+1=0
2x-4y+1=0
The value of a such that x3+3ax2+3a2x+b is increasing on R-{-a} are
1, 2
a, b are any real numbers
-1, 2
±1
If f(x)= x(√x-√(x+1)) then
f(x) is continuous but not differentiable at x=0
f(x) is differentiable at x=0
f(x) is not differentiable