The points (2,5), (0,3), (2,1), (4,3) taken in order, form
Parallelogram
rectangle
rhombus
aquare
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
The number of terms in the expansion of (a+b+c+d)5 is
20
120
336
56
In ΔABC,tan A+tan B+tan C =
sin A sin B sin C
cos A cos B cos C
tan A tan B tan C
cot A cot B cot C
If f(x)=x3-2x2+7x+5 then f(x-2)=
x3-8x2-27x+25
x3+8x2+27x+25
x3-8x2+27x-25
x3+8x2+27x-25
The equation of the sphere on the join of (3, 4, -1), (-2, -1, 0) as diameter is
r2-r.(i+3j-2k)=10
r2-2r.(i+2j-2k)+10=0
r2-2r.(i+2j-2k)=10
r2-2r.(5i+5j-2k)+20=0
If ((1+i)x-2i)/(3+i)+((2-3i)y+i/3-i)=I, then (x,y)=
(0,0)
(3,1)
(3,-1)
(-3,1)
If 4y=x+7 is diameter of the circumscribing circle of the rectangle ABCD and A(-3, 4), B(5, 4), then the area of the rectangle is
31 s. u
32 s. u
35 s. u
none
The lines acosθ+2sinθ+(1/r)=0, bcosθ+3sinθ+(1/r)=0 and ccosθ+4sinθ+(1/r)=0 are concurrent then a,b,c are in
A.G.P
H.P
G.P
A.P
I: In a ΔABC, if 4s(s-a) (s-b) (s-c) =a2b2 then it is right angled triangle II: In a ΔABC, if sin A+ sin B +sin C maximum then triangle is equilateral
only I is true
only II is true
both I,II are true
neither I and II is true
A lot consists of 12 good pencils, 6 with minor defects and 2 with major defects. A pencil is drawn at random. The probability that this pencil is not defective is
3/5
3/10
2/5
1/2
The ascending order of A= Sin-1(log32),B= Cos-1(log3(1/2)), C=Tan-1(log1/3 2) is
C,B,A
B, A,C
C, A, B
B, C, A
If cos 2θ+cos 8θ= cos 5θ then θ=
(2n+1) π/4 : n ε Z or 2n π ± 2 π/3: n ε Z
nπ/4: n ε Z or nπ ± π/6: n ε Z
nπ: n ε Z or (2n+1) π/9: n ε Z
(2n+1) π / 10: n ε Z or 2nπ/3 ± π / 9: n ε Z
Three groups of children contain 3girls and one boy;2 boys; 2 girls and 2 boys. One girl and 3 boys. One child is is selected at random from each group. The probability that three selected consists of 1 girl and 2 boys is
13/32
19/32
13/19
6/19
If A,B,C,D are the sum of the squares of the roots of 2x2+x-3=0,x2-x+2=0,3x2-2x+1=0,x2-x+1=0 then the ascending order of A,B,C,D is
A,B,C,D
B,D,C,A
A,C,B,D
C,D,A,B
sin A+sin 5A+sin 9A)/(cos A+ cos 5A+ cos 9A)=
tan 2A
tan 3A
tan 4A
tan 5A
The lines 2x+3y = 6,2x+3y = 8 cut the x-axis at A,B respectively.A line L=0 drawn,through the point(2,2) meets the x-axis at C in such a way that abscissa of A,B and C are in the arithmetic progression.Then the equation of L=0 is
2x+3y=10
3x+2y=10
3x-2y=2
2x+y=6
For the curve y2=(x+a)3, the square of the sub tangent is……. Subnormal
Equal to
Varies as
Double the
Square of the
If A= Tanh-1 (1/2)+ Coth-1(2), B= sinh(Cosh-1 9), C= sech2(Tanh-1 1/2)+cosech2(Coth-1 3) then
A
B
(2-)5 + (2+)5 =
1360
1364
1373
1374
Tan (tan-1 1/2+ tan-11/3) =
1
2
4
5
Two tangents are drawn from the point (-2, -1) to the parabola y2 = 4x. If α is the angle between those tangents then tan α =
3
1/3
Let n = 1! +4! +7!+................ +400! Then ten's digit of n is
6
7
The angle at which the circles x2+y2+8x-2y-9=0 and x2+y2-2x+8y-7=0 intersects is
Obtuse
π/6
π/3
π/2
(cosh x+ sinh x)n=
cosh nx+ sinh nx
tanh nx6coth nx
coth nx+sech nx
sinh nx+cosech nx
1.nC0+41.nC1+42.nC2+43.nC3+……..+4n.nCn =
2n
3n
4n
5n
If m and M respectively denote the minimum and maximum of f(x) = (x - 1)2+ 3 for x ε [ -3, 1], then the ordered pair (m, M) is equal to
(-3, 19)
(3, 19)
(-19,3)
(-19,-3)
If f(x)=x2sin(1/x) for x≠0, f(0)=0 then
f and f1are continuous at x=0
f is derivative at x=0 and f1is not continuous at x=0
f is derivable at x=0 and f1 is continuous at x=0
noneof these
The point of contact of 2x – y + 2 = 0 to the parabolay2 = 16x is
(2,4)
(3,4)
(1,4)
(2,1)
13+23+ 33+….+1003=k2, then k=
10100
5000
5050
1010
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)
The distance of the point (4, 1) measured along a line making an angle 1350 with the x-axis is
0
13√2/2
11√2/4
7√2/5
For the parabola y2 +6y-2x+5 = 0(I) The vertex is (-2 , -3)(II) The directrix is y+3 = 0
Both I and II are true
I is true, II is false
I is false, II is true
Both I and II are false
The equation of the normal to the curve (x/a)2/3+(y/b)2/3=1 at (a cos3θ, b sin3θ ) is
ax cosθ+by sinθ=a2 cos4+b2 sin4θ
ax cosθ-by sinθ=a2 cos4-b2 sin4θ
x/acosθ+y/b sinθ=1
x/acosθ-y/b sinθ=1
The condition that the lines joining the origin to the points of intersection of x/a+y/b=1, 5(x2+y2+bx+ay)=9ab are at a right angles is
A=b
2a=b or a=2b
A+b
a-b
sin 480.sin 120=
1+√5/8
1-√5/8
√5+1/8
√5-1/8
Domain of log(x-2)/√3-x is
(2, 3)
[2, 3)
(2, ∞)
(-∞, 3)
The locus of a point P such that the distances from P to the points (2,3,5) ,( 1,2,-1) are in the ratio 5:2 is
21x2+21y2+21z2-34x-76y+90z-2=0
21x2-21y2+21z2-34x-76y+90z-2=0
21x2+21y2+21z2-34x+76y+90z+2=0
21x2-21y2-21z2-34x-76y+90z-2=0
The ascending order of A= Sin-1(sin 8π/7),B= Cos-1(cos 8π/7), ), C=Tan-1(tan 8π/7) is
B,A, C
B,C,A
A,B,C
A,C,B
The equation of the hyperbola with its transverse axis is parallel to y-axis, and its centre is (2,-3), the length of transverse axis is 12 and eccentricity 7/6 is
(y+3)2/6-(x+2)2/3=1
(y-3)2/36-(x-2)2/13=1
(y+3)2/9-(x-2)2/4=1
(y+3)2/36-(x-2)2/13=1
The length of latus rectum of parabola y2+8x-2y+17 = 0 is:
8
16
The coefficient of x6 in (1+x+x2+x3+x4+x5)6 is
456
365
256
425
If the focus and directrix of a parabola are (3,-4) and x+y+7=0 then its length of latusrectum is
6√2
10√2
8√2
3√2
The sub-tangent, ordinate and sub-normal to the parabola y2 = 4ax at a point ( diffferent from the origin ) are in
A.P.
H.P.
G.P.
None
The radius and height of a cylinder are measured as 5cm and 10 cm respectively and there is an error of 0.02 cm in both the measurements. The approximate error in the volume is
4π cubic cm
2.5 π cubic cm
0.06 π cubic cm
0.6 π cubic cm
The equation Sin-1 x- Cos-1 x=Cos-1 (√3/2) has
no solution
unique solution
infinite number of solutions
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
If the variable line l1(x-a)+y=0 and l2(x+a)+y=0 are conjugate lines w. r. to the ellipse x2/a2+y2/b2=1. Then the locus of their point of intersection is
x2/a2+y2/b2=1
x2/a2+2y2/b2=1
x2/a2+y2/b2=2
7 Coupons are numbered 1 to 7. Four are drawn one by one with replacement. The probability that the least number appearing on any selected coupon is greater then or equal to 5 is
(3/7)4
6/73
4/73
(3/4)4
If three points A, B and C have position vectors (1, x, 3), (3, 4, 7) and (y, -2, -5) respectively and if they are collinear then (x, y) is equal to
(-2, 3)
(-2, -3)
(2, -3)
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
1/4
1/5
2/17
If ( x - 2 ) is a common factor of the expressions x2 + ax + b and x2 +cx+ d, then b-d/c-a is equal to :
-2
-1
(cos A+ cos 3A+cos 5A+cos 7A)/ (sin A+sin 3A+sin 5A+sin 7A)=
sin 4A
cos 4A
cot 4A
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
The angles of the triangle formed by the lines 5x+3y-15=0, x+y-4=0, 2x+y-6=0 is
cos-1(4/√17), cos-1(13/√170), π+ cos-1(3/√10)
cos-1(4/√17), cos-1(13/√170), π- cos-1(3/√10)
cos-1(2/√5), π/2,-π/2- cos-1(2/√5)
cos-1(2/√5), π/2,-π/2+cos-1(2/√5)
The two curves 2x2+y2=20, x2-4y2+8=0
Touch each other
Cut orthogonally
Cut at an angle of 450
If the equation of the pair of tangents drawn from (1, 2) on the ellipse x2+2y2=2 is 3x2-4xy-y2+ax+by+c=0 then the ascending order of a, b, c is
a, b, c
b, c, a
c, a, b
b, a, c
The locus of a point P for which the chord of contact of x2/a2+y2/b2=1 touch the circle x2+y2=r2
x2/a4+y2/b4=1/r4
x2/a4+y2/b4=1/r2
y2/a4+x2/b4=1/r2
x2/a4+y2/b4=-1/r2
The orthocentre of the triangle formed by the points(2,-1,1), (1,-3,-5), (3,-4,-4) is
(2,-1,1)
(1,-3,-5)
(3,-4,-4)
(2,-8/3,-8/3)
The number of possitive odd divisors of 216 is
12
If x2-cx+d=0, x2-ax+b=0 have one common root and second has equal roots then 2(b+d)= .If x2-cx+d=0, x2-ax+b=0 have one common root and second has equal roots then 2(b+d)= 1)0 2)ac 3)a+c 4)a-c
ac
a+c
a-c
The quadrilateral formed by the lines x-y+2=0, x+y=0, x-y-4=0, x+y-12=0 is
Rectangle
Rhombus
Square
cos3200+ cos31000 +cos3 1400=
3/4
3/8
3√3/8
√3/2
Minimum value of 25 cos2 x +16 sec2 x is
9
25
40
A particle is moving along a line according to the law s=t3-3t2+5. The acceleration of the particle at the instant where the velocity is zero is
2unit/sec2
4unit/sec2
6unit/sec2
8unit/sec2
If θ lies in the first quadrant and 5 tan θ = 4 then (5 sin θ - 3 cos θ) / (sin θ + 2 cos θ) is equal to
5/14
3/14
1/14
The value of k for which the points A(1, 0, 3), B(-1, 3, 4), C(1, 2, 1) and D(k, 2, 5) are coplanar is
The point on the curve x2=2y which is closest to the point (0, 5) is
(±2√2, 3)
(±2√2, 4)
(±√2, 3)
(±√3, 4)
If the tangent at θ=π/4 to the curve x=a cos3θ, y= a sin3θ meets the x and y axis in A and B, then the length of AB is
a
2a
a2
a/2
The radius of the base and depth of a conical funnel are 20 cm and 40 cm respectively. Water flows from the funnel at the rate 2.25 cc/sec. the rate at which the water level decreases when altitude is 30 cm is
5/8π cm/sec
1/100π cm/sec
5/12π cm/sec
1/120π cm/sec
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 equation to the circle touching the y-axis at the origin and passing through(b, c) is
b(x2+y2)=x(b2-c2)
b(x2+y2)=y(b2+c2)
b(x2+y2)=x(b2+c2)
b(x2+y2)=y(b2-c2)
If α,β,γ,δ are the roots of 3x4-8x3+x2-10x+5=0 then the equation whose roots are –α,-β,-γ,-δ is
3x4+8x3+x2+10x+5=0
3x4+8x3+x2-10x+5=0
3x4-8x3+x2-10x+5=0
3x4-8x3+x2+10x+5=0
The equation of the circle passing through the point of intersection of the circles x2+y2-3x-6y+8=0, x2+y2-2x-4y+4=0 and touching the line x+2v=5 is
x2+y2-x-2y=0
x2+y2=4
x2+y2+4=0
Tan [cos-1 4/5+tan-1 2/3] =
11/6
13/6
17/6
(1.03)19 =
1.2529
1.7250
1.7215
1.7535
8 cos3 100 -6cos100=
√3
√2
If y2=4ax then 4a(1+y12)3/2+(y2+4a2)3/2y2=
The equation of the normal to the curve y2=x3/2a-x at (a, a) is
y+2x=a
2x-y=a
x+2y=3a
2y-x=3a
The vector of magnitude √51 which makes equal angles with the vector a=1/3(i-2j+2k), b=1/5(-4i-3k), c=j is
±(i+2j-k)
±(2i+j-k)
±(5i-j-5k)
The circumcentre of the triangle formed by(0,0), (2, -1) and ( -1, 3) is (5/2,5/2). Then the orthocentre is
(-4, -3)
(4, 3)
(-4, 3)
(4, -2)
At a selection, the probability of selection of A is 1/7 and that of B is 1/5.The probability that both of them would not be selected is
12/35
16/35
24/35
32/35
There are 25 st5amps numbered from 1 to 25 in a box. If a stamp is drawn at random from the box, the probability that the number on the stamp will be a prime number is
7/25
8/25
9/25
6/25
sin 780 -sin 180 +cos 1320=
For a binomial variate X with n = 6, if P(X = 2) = 9P(X = 4), then its variance is
8 / 9
1 / 4
9 / 8
(x+y+z)(x+yω+zω2)(x+yω2+zω)=
x3+y3+z3+3xyz
x3+y3+z3-3xyz
x3+y3+z3
cos2(450- α)+ cos2(150+ α)- cos2(150- α)=
The circle x2+y2-4x+4y-1=0 cuts the positive coordinate axes in A and B respectively. The equation to the diameter of the circle perpendicular to the chord AB is
5x+20=(90+4√5)(x+2)
2y+12=(19+4√5)(x-2)
10y+121=(9+4√5)(x-2)
y+2=(9+4√5)(x-2)
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
The roots of the equation a(b-c)x2+b(c-a)x+c(a-b)=0 are
a,c(a-b)/a(b-c)
c(a-b)/a(b-c),b(c-a)/a(b-c)
1, b(c-a)/a(b-c)
1, c(a-b)/a(b-c)
cot 160 cot 440+cot 440cot 760- cot 760cot 160=
If [(x2+x+1)/(x2+2x+1)]=A+[B/(x+1)]+[C/(x+1)2] then A-B=
4C
4C+1
3C
2C
If the expression x2-(5m-2)x+(4m2+10m+25)=0 can be expressed as a perfect square,then m=
8/3 or 4
-8/3 or 4
4/3 or 8
-4/3 or 8
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
If 10 balls are to be distributed among 4 boxes, that the probability for the first box always to contain 4 ball is
10C4* 36/ 410
10C4* 63/ 410
10C4 /410
If , in a right triangle ABC, the hypotenuse AB=p, then AB.AC+BC.BA+CA.CB=
2p2
p2/2
p2
The straight line x + y = k touches the parabola y = x-x2, if k =
sin2200+ sin21000 +sin2 1400=
3/2
1/√2
If radii of two circles are 4 and 3 and distance between centres is √37 then the angle between the circles is
300
450
600
900
If α,β are the roots of 6x2-6x+1=0 then 1/2(a+bα+cα2+dα3)+1/2(a+bβ+cβ2+dβ3)=
a+b+c+d
a+2b+3c+4d
a+b/2+c/3+d/4