The length of the intercept made by the normal at (1,6) of the circle x2+y2-4x-6y+3=0 between the coordinate axes is
√(5/2)
3√10
2√5
√5
The The limiting points of the coaxal system x2+y2+2µy+9=0 are
(±2, 0)
(0, ±3)
(0, 2)
(1, 3)
The curve y=a2+bx has minimum at (2, -1) on it. Then (a, b)=
(3, -12)
(-3, 12)
(-3, -12)
(3, 12)
If (1,2), (4, 3) are the limiting points of a coaxal system , then the equation of the circle in its conjugate system having minimum area is
x2+y2-2x-4y+5=0
x2+y2-8x-6y+25=0
x2+y2-5x-5y+10=0
x2+y2+5x+5y-10=0
If a polygon of n sides has 275 diagonals, then n is equal to
25
35
20
15
In ΔABC, R2 (sin 2A+sin 2B+sin 2C)=
Δ
3Δ
2Δ
4Δ
The length of the chord intercepted bt the parabola y = x2 + 3x on the line x + y = 5 is
3 √26
2√26
2√2
None
If the product of the roots of the equation 5x2-4x+2+k(4x2-2x-1)=0 is 2,then k=
-8/9
8/9
4/9
-4/9
C2+C4+C6+……….. =
2n-1-1
2n+1
2n-1/3
2n-1/5
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
If ay4=(x+b)5then 5yy2=1
y12
y2
y1
y
The equation whose roots are 2√3-5 and -2√3-5 is
x2+10x-13=0
x2-10x+13=0
x2+10x+13=0
x2-10x-13=0
One focus of an ellipse is (1,0) and (0,0). If the length of major axis is 6 its e=
1/4
2/3
1/3
1/2
The condition that the pair of tangents drawn from (g, f) to the circle x2+y2+2gx+2fy+c=0 may be at right angles is
g2+f2+c=0
g2+f2=c
g2+f2=2c
2(g2+f2)=c
The equation of the axis of the parabola 3x2 – 9x + 5y -2 = 0 is
X – 2 =0
X – 1 = 0
X – 3 = 0
2x – 3 = 0
If the length of the tangent from (h, k) to the circle x2+y2=16 is twice the length of the tangent from the same point to the circle x2+y2+2x+2y=0, then
h2+k2+4h+4k+16=0
h2+k2+3h+3k=0
3h2+3k2+8h+8k+16=0
3h2+3k2+4h+4k+16=0
The odds against A solving a problem are 3 to 2 and the odds in favour of B solving the same problem ae5 to 4.Thenthe probability that the problem will be solved if both of them try the problem is
16/21
52/77
11/15
1/5
If y = xn-1 log x then xy1-(n-1)y =
xn-2
xn-1
xn
xn+1
If a,b,c are three non-collinear points then r=(1-p-q)a+pb+qc represents
line
plane
plane passing through origin
sphere
x2-y2+5x+8y-4=0 represents
parabola
Ellipse
hyperbola
none
The coefficient of x6 in (1+x+x2+x3+x4+x5)6 is
456
365
256
425
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 the roots of px3+qx2+rx+s=0 are in A.P,then the roots of 8px3+4qx2+2rx+s=0 are in
A.P
G.P
H.P
A.G.P
If the polar of (2, -1) with respect to the ellipse 3x2+4y2=12 is ax+by+c=0 then the ascending order of a, b, c is
a, b, c
c, b, a
c, a, b
b, a, c
If the circles x2+y2+2x+c=0 and x2+y2+2y+c=0 touch each other then c=
2
4
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
In the Argand plane, the points represented by the complex number s 2-6i, 4-7i, 3-5i and 1-4i form
parallelogram
rectangle
rhombus
square
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
If a=i+j-2k , b=-i+2j+k, c=i-2j+2k then a unit vector parallel to a+b+c=
2i+j+k/√6
i+j+k/√3
i-2j+k/√6
i-j+k/√3
The value of k if (1,2), (k,-1) are conjugate points with respect to the ellipse 2x2+3y2=6 is
6
8
If the area of the triangle formed by the points (t,2t), (-2,6), (3,1) is 5sq.unit, then t is
½,2
2,2/3
77,83
½,-1
d/dx{√(1+cos x)/sin x}=
√sin x/(2(1-cos x)√(1+cos x))
- √sin x/(2(1-cos x)√(1+cos x))
√sin x/ 2(1+cos x)√(1+cos x)
-√sin x/2(1+cos x)√(1+cos x)
{n (n+1) (2n+1) : n Є Z } is subset of
{6k : k Є Z}
{12k : k Є Z}
{18k : k Є Z}
{24k : k Є Z}
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
If dx + dy =(x + y) ( dx- dy ) then log ( x + y ) is equal to
x + y + c
x +2 y + c
x - y + c
2x + y + c
The equation of the circle cutting orthogonally the circles x2+y2-8x-2y+16=0, x2+y2-4x-4y-1=0 and passing through the point (1, 1) is
3x2+3y2-14x+23y-15=0
x2+y2+2x-6y-6=0
x2+y2+16y-8=0
4x2+4y2-15x-4=0
In a class 40% of students read History, 25% Civics and 15% both History and Civics. If a student is selected at random from that class, the probability that he reads history, if it is known that he reads Civics is
2/5
3/5
3/8
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)
The point of contact of 2x – y + 2 = 0 to the parabolay2 = 16x is
(2,4)
(3,4)
(1,4)
(2,1)
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 A=sin2θ + cos4θ, then for all values of θ, where
1 ≤ A ≤ 2
(3/4) ≤ A ≤ 1
0 ≤ A ≤ 1
(1/4) ≤ A ≤ (1/2)
The value of Cot [Cot-1 7+ Cot-1 8+ Cot-1 (18)] is
5
3
If u=3(lx+my+nz)2-(x2+y2+z2) and l2+m2+n2=1 then uxx+uyy+uzz=
0
u
2u
If 9P5+5.9P4=10Pr then r=
7
The equation of the normal at a point hose eccentric angle is 3π/2+θ to the ellipse x2/9+y2/4=1 is
3x/sin θ+2y/cos θ=5
3x/sin θ-2y/cos θ=5
2x/sin θ+3y/cos θ=5
2x/sin θ-3y/cos θ=5
The fourth vertex of the parallelogram whose consecutive vertices are (2,4,-1), (3,6,-1),(4,5,1) is
(3,3,1)
(4,-2,-4)
(2,2/3,2)
(5,0,1)
The equation of the line passing through the point P (1, 2) such that P bisects the part intercepted between the axes is
x+2y=5
x-y+1=0
x+y-31=0
2x+y-4=0
The length of the intercept made by the sphere x2+y2+z2-4x+6y+8z+4=0 on z axis is
4√3
2√13
2√15
2√18
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
Number of spheres drawn through the points (0, 0, 0), (1, 0, 0),(0, 1, 0),(1, 1, 0) are
Infinite
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
A plane passes through (2, 3, -1) and is perpendicular to the line having direction ratios ( 3, -4, 7). The perpendicular distance from the origin to this plane is
13/√74
3/√74
5/√74
6/√74
d/dx{Tan-1(a+bcos x/b+a cos x)}=
(a2-b2)sin x/(a2+b2)(1+cos2 x)+4ab cos x
sin x/(a2+b2)cos2 x
sin x/(1+cos2x)+4ab cos x
The derivative of (x2+1)5(2x+3)3 w.r.t is
6(x2+1)5(2x+3)2+10x(x2+1)4(2x+3)3
6(x2-1)5(2x+3)2+10x(x2+1)4(2x+3)3
6(x2+1)5(2x-3)2+10x(x2+1)4(2x-3)3
6(x2-1)5(2x+3)2+10x(x2+1)4(2x-3)3
If x-y=Sin-1 x-Sin-1 y then dy/dx=
√y(4x√x-√y)/√x(2√y+√x)
√y(1-2√xy-y)/√x(1+2√xy+x)
2x+3/2y+5
√1-y2-√(1-x2)(1-y2)/√(1-x2)-√(1-x2)(1-y2)
I .thev locusv of the midpoints of chords of the parabola y2 = 4ax which substends a right angle at the vertex is y2 = 2a (x – 4a) II. the locus of midpoint of chords of the parabola y2 = 4ax which touch the circle X2 + y2 = a2 is (y2- 2ax)2 = a2 (y2 + 4a2)
Only I is true
Only II is true
Both I and II are true
Neither I nor II true
The radius of the sphere x2+y2+z2-2x+4y-6z+7=0 is
49
-7
√7
If y= x2+1/(x2+1/x2+....∞), then dy/dx=
2xy2/y2+1
2xy/y2+1
2x/y2+1
2/y2+1
If f(x)= (a-xn)1/n, where a>0 and n?N, then (fof)(x)=
a
x
an
Tangents are drawn from the Point (-2, -1) to the hyperbola 2x2-3y2=6. Their equations are
3x-y+5=0, x-y+1=0
3x+y+5=0, x+y+1=0
3x-y-5=0, x-y-1=0
3x+y-5=0, x+y-1=0
The condition that the pairs of lines ax2+2pxy-ay2=0, bx2-2qxy-by2=0 are such that each pair bisects the angle between the other pair is
ab=pq
ab+pq=0
a/b=p/q
ap=bq
The number of non-zero terms in the expansion of (1+3√2x)9+(1+3√2x)9is equal to:
9
10
The ratio in which yz-plane divides the line segment joining (3,4,5) ,(2,-3,1) is
1:2
2:1
1:3
3:-2
If the circles (x+a) 2+(y+b) 2=a2,(x+α) 2+(y+β) 2=β2 cut orthogonally then α2+b2=
aα+bβ
α2+β2=
-2(aα+bβ)
2(aα+bβ)
The coefficient of x2 in1+x2/(1-x)3 is
12
If a, b, c are the sides of a triangle then the range of ab+bc+ca/a2+b2+c2 is
[1, 2]
(1/2, 1]
[1/2, 2)
(-1/2, 2)
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)
d/dx{Tan-1(acos x-bsin x/b cos x+a sin x)}=
1
-1
-1/2
If a hyperbola has one focus at the origin and its eccentricity is √2. One of the directries is x+y+1=0. Then the equations to its asymptotes are
x-1=0, y-1=0
x+1=0, y+1=0
x+3=0, y+3=0
x+2=0, y+2=0
A bag X contains 2 white and 3 black balls and another bag Y contains 4 white and 2 black balls.One bag is selected at random and a ball is drawn from it.Then the probability for the ball chosen be white,is
2/15
7/15
8/15
14/15
If A+B+C= 1800 then cos A+cos B+ cos C=
1+4sin A/2sin B/2 sin C/2
1+4 cos A/2cos B/2sin C/2
1+ 4 cos A/2 cos B/2 cos C/2
1+ 4cos A/2sin B/2 cos C/2
If y= x log|x+√(1+x2)|-√(1+x2) then dy/dx=
log(x-√(1-x2)
1/2 log(x+√(1+x2)
sinh-1 x
Sin (4 arc Tan-11/3) =
24/25
25/24
27/29
29/27
The condition that the line x cos α + y sin α =p to be a tangent to the hyperbola x2/a2 -y2/b2 =1 is
a2 cos2 α+ b2 sin2 α =p2
a2 cos2 α- b2 sin2 α =p2
a2 sin2 α+ b2 cos2 α =p2
1+[(1/2).(3/5)]+[(1.3/2.4)(3/5)2]+[(1.3.5/2.4.6)(3/5)3]+-------∞=
√(2/5)
(1/2)√(5/2)
√(5/3)
sin2200+ sin21000 +sin2 1400=
3/2
√3/2
1/√2
cos2 360+ cos2 720=
-2/3
3/4
If b + c = 3a, then cot B/2 cot C/2 is equal to :
The area (in square unit) of the triangle formed by the points with polar coordinates (1,0) , (2 , π/3)and (3, 2π/3)
11√3 / 4
5√3 /4
5/4
11/4
The quadrilateral formed by the lines x-y+2=0, x+y=0, x-y-4=0, x+y-12=0 is
Parallelogram
Rectangle
Rhombus
Square
The condition that the slope of a line represented by ax2+2hxy+by2=0 is thrice that of the other is
3h2=4ab
h2=ab
9h2=16ab
3h2=8ab
The derivative of cot-1(cosec x-cot x) w.r.to x is
The area bounded by the curve xy=4,x-axis and the ordinates x=2,x=5 is
2 log 5/2
4 log 5/2
5 log 5/2
3 log 5/2
The centres of similitude of the circles x2+y2-2x-6y+9=0, x2+y2=1 is
(1/3, 1), (-1, -3)
(1/5, -1), (-1, -5)
(1/3, 1), (1, 3)
(-1/3, -1), (-1, -3)
The equation of the sphere which passes through the four points (0,0,0), (1,0,0), (0,1,0) and (0,0,1) is
x2+y2+z2-x-y-z=0
x2+y2+z2-2x-2y-2z=0
x2+y2+z2+2x+2y+2z=0
x2+y2+z2+x+y+z=0
The equation of the line passing through the point of intersection of the lines x+y-5=0, 2x-y+4=0 and having intercepts numerically equal is
x+y-5=0 or 3x-3y+13=0
x-y-5=0 or 3x-3y+13=0
x+y-5=0 or 3x+3y+13=0
x+y+5=0 or 3x-3y-13=0
If tan(A+B)=m,tan(A-B)= n,then tan 2A=
(m+n)/(1-mn)
(m-n)/(1-mn)
(m+n)/ (1+mn)
(m-n)/(1+mn)
A bag contains four balls. Two balls are drawn and found them to be white. The probability that all the balls are white is
4/6
If nεN then 3.52n+1+23n+1 is divisible by
24
64
17
676
18 guests have to be seated half on each side of a long table. 4 particular guests desire to sit on one particular side and 3 others on the other side. Determine the number of ways in which the sitting arrangements cn be made
(9!)2
11C4(9!)2
11C3(9!)2
11C5(9!)2
The circumcentre of the triangle formed by 3x+4y-20=0 with the pair of lines 2x2-3xy-2y2=0 is
(2,3)
(3,3)
(3,2)
(0,5)
The area of the triangle whose vertices are (a,θ),(2a,θ+π/3) and (3a,θ+2π/3) is (in sq.unit)
7√3a2/4
5√3a2/4
3√3a2/4
√3a2/4
cot(A+150)- tan(A- 150)=
4cos 2A/1+2 cos 2A
4cos 2A/1-2 sin 2A
4cos 2A/1+2 sin 2A
4cos 2A/1-2 cos 2A
If cosec θ-sin θ=m, sec θ-cos θ=n then (m2n)2/3+(mn2)2/3=
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 tower of a bridge ,hung in the form of a parabola,have their tops 30meters above the rod way are 200 meters apart .If the cable is 5 meters above the road way at the center of bridge ,then the length of the vertical supporting cable 30 meters from the centre is
100 m
30 m
9/4 m
29/4 m
If x -y+ 1 = 0 meets the circle x2 + y2 + y - 1 = 0 at A and B, then the equation of the circle with AB as diameter is
2 (x2 + y2) + 3x - y + 1=0
2(x2 + y2) + 3x - y + 2 = 0
2(x2 + y2) + 3x-y +3 = 0
x2 + y2 + 3x-y +1 = 0
If x= -5+4i then x4+9x3+35x2-x+4=
-170
160
170
-160
If f(x)=log (x-5)(2-x), g(x)=log (x-5), h(x)= log (2-x) then
f(x)=g(x)+h(x)
f(x)=g(x)-h(x)
f(x)=g(x)h(x)
If x2-xy+y2=1 and y’’(1)=
-6