If f(x)=√(1-√(1-x2)), then
f(x) is continuous every where
f is differentiable everywhere
f is differentiable at x=0
none
If Cos (A-B) = 3/5 and tan A tan B = 2 then which one of the following is true
sin (A+B) = 1/5
sin (A+B) = -1/5
cos (A-B) = 1/5
cos (A+B) = -1/5
.In ΔABC, if 2R+ r= r1, then the triangle isa
isosceles
equilatcral
right angled
If the roots of the equation 4x3-12x2+11 x + k = 0 are in arithmetic progression, then k is equal to :
-3
1
2
3
If (1,2),(4,3) are the limiting points of coaxal system,then the equation of the circle in its conjugate system having minimum area is
x2+y2+5x+5y-10=0
x2+y2-2x-2y+10=0
x2+y2-8x-6y+25=0
x2+y2-5x-5y+10=0
If y=x+1/(x+1/x+....∞) then dy/dx=
y/2y-x
y/x+2y
y/x-2y
y
If the range of a random variable X is {0, 1, 2, 3, 4,........} with P(X = k) = (k+1)a / 3k for k ≥ 0 then a is equal to
2 / 3
4 / 9
8 / 27
16 / 81
If ak is the coefficient of xk in the expansion of (1+x+x2)n for k = 0,1,2,..........2n then a1 + 2a2 +.....+2na2n =
-ao
3n
n.3n+1
n.3n
A person of height 180 cm starts from a lamp post of height 450 cm and walks at the constant rate of 4 km per hour. The rate at which his shadow increases is
2kmph
6.4kmph
8/3kmph
4kmph
The circumcentre of the triangle with vertices at A(5, 12),B(12, 5), c (2√(13 ) ,3√(13 )) is
(0, 1)
(1, 0)
(0. 0)
(1, 1)
If cos θ+ sin θ=a, then sin 2θ=
a2+1
a2-1
a2
If g is the inverse of f and f1(x)=1/(1+xn),then g1(x) equals,
1+xn
1+[f(x)]n
1+[g(x)]n
xn
The circles x2+y2-4x+6y+8=0 and x2+y2-10x-6y+14=0,touch
externally
internally
intersect
do not touch
If a=2i+3j+6k, b=3i-6j+2k, c=6i+2j-3k then axb=
3c
5c
13c
169c
If n positive integers are taken at random and multiplied together , the probability that the last digit of the product is 2,4,6 or 8 is
5n-3n/5n
4n+2n/5n
3n-2n/5n
3n-2n/4n
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
If the distance of two points P and Q on the parabola y2 = 4ax are 4 and 9 respectively,then 9 respectively,then the distance of the point of intersection of the tangents at P and Q fro the focus is
8
6
5
13
If (3+i) is a root of the equation x2 + ax+ b=0 then a =
-6
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 sum of divisors of 253453 is
60
120
1189188
1378154
2 cos 540. Sin 660=
√3/2+ sin120
√3/2-sin120
√3/2+ cos 120
√3/2-cos 120
∫ exloga , ex dx is equal to :
ax/logae
ex/1+logea + c
(ae)x + c
none of these
Assertion(A):x2+x+1 is greater than zero for all real x. Reason(R):when b2-4ac
A is false but R is true
A is true but R is false
Both A and R are true and R is not the correct explanation of A
Both A and R are true and R is the correct explanation of A
If the inverse point of (1, -1) with respect to the circle x2+y2=1/4 is C then Cx+Cy=
0
(1/4. -1/8)
1/4
(sin 3A+ sin A) sin A+ (cos 3A- cos A) cos A=
The number of non trivial solutions of the system x-y+z =0 ,x+2y-z=0 and 2x-y+3z=0 is
If the latusrectum of a hyperbola subtends an angle 600 at the other focus then its e=
√6
√5
√3
√2
The sum of the first n terms of the series 12+2.22+32+2.42+52+2.62+…. Is n(n+1)2/2 when n is even. When n is odd the sum is
3n(n+1)/2
[n(n+1)/2]2
n(n+1)2/4
n2(n+1)/2
The system of circle x2+y2+2λx-5=0 is
intersecting
non intersecting
touching
If the coefficients of (2r+1)th term and (4r+5)th term in the expansion of (1+x)10 are equal then r=
4
If ax+by+c=0 is the equation of the common radical axis of the coaxial system (3x2+3y2-2x-2y-1)+λ(x2+y2-x-2y-3)=0 then ab+bc+ca=
44
40
12
The equation of the incircle of triangle formed by x=0,y=0 and (x/3)+(y/4)=1 is
x2+y2-4x-4y+4=0
x2+y2-2x-2y=0
x2+y2-2x-2y+1=0
The locus of the point of intersection of two tangents drawn to the circle x2+y2=a2 which make a constant angle α to each other is
(x2+y2-a2)2=4a2(x2+y2+a2) tan2 α
(x2+y2-a2)2=4a2(x2+y2+a2) cot2 α
(x2+y2-2a2)2=4a2(x2+y2-a2) cot2 α
(x2+y2-2a2)2=4a2(x2+y2-a2)
If f(x,y,z)=√(yz)+ √(zx)+ √(xy) then xfx+yfy+zfz=
√x+√y+√z
f(x,y,z)
2f(x,y,z)
If n is a positive integer, then the coefficient of xn in the expansion of (1 + x)n/(1-x) is
n.2n
2n-1
2n
(n +1)2n
All the values of x satisfying sin 2x+ sin 4x= 2 sin 3x are
nπ/3
2nπ
nπ
nπ + π/3
If (1 + x)n = C0 + C1x + C2x2 + …. + CnXn, then C0 - C2 + C4 - C6 + … is equal to:
2n/2 sin [(nπ) / 4]
2n/2 cos [(nπ) / 4]
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
If cot θ=8/15 and θ does not lie in the first quadrant, then cos(300+ θ) +sin(450- θ)+cos(1200+ θ)=
(1/34)(23+7√3+7√2)
(1/34)(23+7√3-7√2)
(1/34)(23-7√2+7√3)
(1/34)(23-7√3-7√2)
The locus of the point of intersection of the tangents at the ends of a chord of a circle x2+y2=a2 which touches the circle x2+y2-2ax=0 is
x2+y2=(y-a)2
x2+y2=(x-a)2
x2=a(a-2x)
y2=a(a+2x)
The point equidistant from the points (-, 0, 0),(1, 0, 0),(0, 2, 0) and (0, 0, 3) is:
(1, 2, 3)
(1/2, 1, 3/2)
(-1/2, -1, -3/2)
(1, -2, 3)
d/dx{Tan-1√(1-sin x/1+sin x)}=
-1
1/2
-1/2
The parabola with directrix x + 2y - 1 = 0 and focus (1, 0) is
4x2 - 4xy + y2 - 8x + 4y + 4 = 0
4x2 + 5xy + y2 + 8x + 4y + 4 = 0
4x2 - 4xy + y2 - 8x - 4y + 4 = 0
If x4-16x3+86x2-176x+105=0 then s1,s2,s3,s4 are
16,86,176,105
18,94,165,115
8,74,83,102
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
1/5
2/17
4 Tan-1 1/5- Tan-1 1/239 =
π
π/2
π/4
3π/4
The least value of (x-a) (x-b) occurs at x=
G.M of a,b
A.M of a, b
H.M of a, b
a+b
The radius of the sphere x2+y2+z2-2x+4y-6z+7=0 is
49
-7
√7
The circumcentre of the triangle formed by the points(1,2,3), (3,-1,5), (4,0,-3) is
(2,1/2,4)
(7/2,-1/2,1)
(5/2,1,0)
(8/3,1/3,5/3)
The solution of dy/dx = y2 / (xy - x2) is
ey/x = kx
ey/x = ky
ex/y = kx
The angle between the line joining the points (1, -2), (3, 2) and the line x+2y-7=0 is
π/3
π/6
If the roots of the equation x2-5x+16=0 are α,β and the roots of the eqution x2+px+q=0 are α2+β2,αβ/2,then
p=1,q=-56
p=-1,q=-56
p=1,q=56
p=-1,q=56
1.22+2.32+3.4+….+n(n+1)2=
n(n+1)(n+2)(3n+5)/12
n(n+1)(n+2)(n+3)/4
2n(n+1)(n+2)(n+3)
n(n+1)(n+2)(3n+1)/12
7/5(1+1/?102 +1.3/1.2.1/104 +1.3.5/1.2.3.1/106 +...........∞)
√(2/3)
21/3
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 point P in the first quadrant of the ellipse x2/8+y2/18=1 so that the area of the triangle formed by the tangent at P and the coordinate axes is least
(2, 3)
(√8, 0)
(√18, 0)
None
The equation of the auxiliary circle of x2/12+y2/18=1 is
x2+y2=12
x2+y2=18
x2+y2=6
x2+y2=30
The 4th term of (1-2x)-1 when x=1/3 is
7/24
8/27
9/32
11/45
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
If a, b, c form a geometric progression with common ratio r,then the sum of the ordinates of the Points of intersection of the line ax + by + c = 0 and the curve x + 2y2=0
–r2/2
–r/2
r/2
r
If A(1, 1), B(√3+1, 2) and C(√3, √3+2) be three vertices of a square, then the diagonal through B is
y=(√3-2)x+(3-√3)
y=0
y=x
y=(√3-2)x+√3+1
(2 cos θ-1) (2 cos 2θ-1) (2 cos 4θ-1) (2 cos 8θ-1)=
(2cos 8θ+1)/ (2 cos θ+1)
(2cos 16θ+1)/ (2 cos θ+1)
The ratio in which ys-plane divides the line segment joining (-3, 4, - 2) and (2,1, 3) is
-4 :1
3 :2
-2 :3
1: 4
A line l meets the circle x2 + y2 = 61 in A,B and P(-5,6) is such that PA = PB= 10. Then the equation of l is :
5x + 6y + 11 =0
5x - 6y - 11 = 0
5x - 6y + 11 = 0
5x - 6y + 12 =0
The common chord of x2+y2-4x-4y=0 and x2+y2=16 substends at the origin an angle equal to
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)
The The limiting points of the coaxal system x2+y2+2µy+9=0 are
(±2, 0)
(0, ±3)
(0, 2)
(1, 3)
If 2x-y+3=0, 4x+ky+3=0 are conjugate with respect to the ellipse 5x2+6y2-15=0 then k=
If 2x+3y+4=0is perpendicular bisector of the segment joining the points A (1, 2) and B (α, β) then the value of α+β is
-81/13
-136/13
-135/13
-134/15
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)
(3, 1)
(7, 5)
(-7, -5)
The equation of the normal to the curve y=3x2+4x-6 at (1, 1) is
X+10y-11=0
x-10y+12=0
X+y-9=0
Two cards are drawn at random from 10 cards numbered 1 to 10. The probability that their sum is odd, if the two cards are drawn together is
2/9
4/9
5/9
3/9
A tangent to the circle x2+y2=4 meets the coordinate axes at P and Q. The locus of mindpoint of PQ is
1/x2+1/y2=1
1/x2+1/y2=1/4
1/x2+1/y2=1/2
The equation of the straight line perpendicular to the straight line 3* + 2y = 0 and passing through the point of intersection of the lines x + 3y - 1 = 0 and x - 2y + 4 = 0 is
2x - 3y +1 =0
2x - 3y +3 =0
2x-3y+5 = 0
2x - 3y +7 =0
The locus of the midpoint of the chord of the circle x2+y2=25 which subtends a right angle at (2,-3) is
x2+y2+2x-3y-6=0
x2+y2-2x-3y-12=0
x2+y2-2x+3y-6=0
x2+y2+2x+3y-24=0
tan 2A- sec Asin A=
sin A. tan 2A
tan A. sec 2A
sec A-sin 2A
cos A- cot 2A
3 horses A, B and C run a race. If the probability of A’s win is twice that of B and the probability of B’s win is thrice that of C then the probabilities of their winning are
6/10, 3/10,1/10
4/7,2/,1/7
5/10,2/10,3/10
If ax= by= cz = dw then the value of x[(1/y)+(1/z)+(1/w)]is
loga(abc)
loga(bcd)
logb(cda)
logc(dab)
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
The equations of the diagonal of the square formed by the pairs of lines 12x2+7xy-12y2=0 and 12x2+7xy-12y2-x+7y=1 is
2x-y=1
x-7y=1
7y-x=1
The angle A ofABC is found by measurement to be 630 an the area is calculated by the formula 1/2bc sin A. the percentage error in the calculated value of the area due to an error of 15 minutes in the measured value of A is
5π/54 oct470
πbc/1440 cos630
5π/36 oct630
πbc/1120 cos420
Three forces having magnitude 5, 4 and 3 act on a particle in the direction 2i-2j-k, i+2j+2k and -2i+2k respectively and the particle gets displacement rom the point A whose position vector is 6i-2j+3k to the point whose position vector is 9i+7j+5k. Then the work done by these forces is
-9 unit
43 unit
38 unit
38/3 unit
The solution of (dy/dx)=ey-x is
ey+ex=c
e-x=e-y+c
ey-x=c
ey+x=c
A man throws a die until he gets a number bigger than 3. The probability that he gets a 5 in the last throw is
1/3
2/3
3/5
The length of the focal chord of the parbola y2 = 4ax which makes an angle θ with its axis is
4a sin2 θ
4a cos2 θ
4 cos2 θ
4a sec2 θ
The locus of the middle points of the chords of the circle x2+y2=8 which are at a distance of √2 units from the centre of circle is
x2+y2=1/2
x2+y2=4
x2+y2=1
x2+y2=2
Origin is the orthocentre of the triangle formed by the points(5,-1), (-2,3) and (-4,-7) then its ninepoint centre is
(-1/3,-5/3)
(5,3)
( 1,1)
(-1/4,-5/4)
Tan-1 3/2-Tan-11/5 =
6 sin 200- 8sin3200=
For a student the probability of getting a pass in one paper is75%and the probability of getting a pass in another paperis60%.The probability is 60% .The probability for the student to pass in one paper only is
3/10
13/20
11/20
9/20
If one end of the diameter of the circle x2+y2-6x+4y-12=0 is (7, -5), then the other end of the diameter is
(-1, -3)
(-1, 1)
(-4, 3)
(-4, 4)
The longest distance from (-3, 2) to the circles x2+y2-2x+2y+1=0 is
18
If a= sin θ+ cos θ, b= sin3 θ+ cos3θ then
a3-3a+2b=0
a3+3a+2b=0
a3+3a-2b=0
If α, β, γ are the angles made by a line with x, y, z axes in positive directions then the range of cos α cos β+ cos β cos γ+cos γ cos α is
[-1/2, 1]
[1/2, ∞)
[1, 2)
[1, ∞)
The equation x2 - 3xy + λy2 + 3x - 5y + 2 = 0, where λ is a real number, represents a pair of straight lines. If θ is the angle between these lines then cosec2 = θ
9
10
100
A five digit number is formed by using the digits 0, 1,2,3,4 and 5 without repetetion.The probability that the number is divisible by 6 is
9/50
10/39
1/16
If the rate of change in y=2x3+3x2-30x+7 is 6 times the rate of change in x, then x=
1, 5
1, -5
2, 3
2, -3
The centre of the circle whose centre is on the straight line 5x – 2y +1=0 and cuts the x-axis at two points whose abscissa are -5 and 3 is
(-1 -2)
(1/5, 1)
(-9/5 , 4)
If α,β,γ are roots of x3-2x2+3x-4=0,then Σα2β2
7
If 3x /(x-a) (x-b) = 2/(x-a) + 1/(x-b) then a:b =
1 : 2
-2 : 1
1 : 3
3 : 1