If α,β are the roots of ax2+bx+c=0;α+h,β+h are the roots of px2+qx+r=0;and D1,D2 the respective discriminants of these equations,then D1:D2=
a2:p2
b2:q2
c2:r2
none
If tan θ= (cos 120+ sin 120)/ (cos 120- sin 120) then θ=
540
570
600
190
1 /3 – 1! + 1 / 4.2! + 1 / 5.3! +………. =
1 /2
1 /4
1/6
1/8
If (1+x+x2)n =Σr=02n rxr then a0+a2+a4+……….+a2n=
3n+1/2
3n-1/2
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
The latusrectum of a hyperbola is 9/2 and eccentricity is 5/4.Its standard equation in standard form is
9x2-16y2=144
9x2-16y2=400
16x2-9y2=144
25x2-16y2=400
A bag contains 6 white and 4 black balls. Two balls are drawn at random. The probability that they are of the same colour, is
1/15
2/5
4/15
7/15
In the expansion of (2-3x)-1 the 3rd term is
9x2/4
9x2/8
27x3/8
27x3/16
If the slope of one line of 8x2+2hxy+by2=0 is double the other, then h2=
3
9
16
If the line lx+my=1 is a normal to the ellipse x2/a2+y2/b2=1 then a2/l2-b2/m2=1
a2-b2
a2+b2
(a2+b2)2
(a2-b2)2
tan (1/2 cos-1(0)) =
0
-1
1
1/2
If f(x)=√(1-√(1-x2)), then
f(x) is continuous every where
f is differentiable everywhere
f is differentiable at x=0
A gas holders contain 100 cubic ft of gas at a pressure of 5 lb per sq. inch. If the pressure is increasing at the rate of 0.05 lb per sq. inch per hour, then the rate of decrease of the volume assuming Boyle’s law pv=a constant is
1 cubic ft/hour
2 cubic ft/hour
4 cubic ft/hour
8 cubic ft/hour
If the circles (x+a)2+(y+b)2=a2, (x+α)2+(y+β)2=β2 cut orthogonally then α2+b2
2(aα+bβ)
-2(aα+bβ)
α2+β2
aα+bβ
If two angles of ∆ ABC are 45o and 60o, then the ratio of the smallest and the greatest sides are
(√3-l) : 1
√3:√2
1 : √3
√3: 1
A line through the origin meets the circle x2+y2=a2 at P and the hyperbola x2-y2=a2 at Q. The locus the point of intersection of the tangent at P to the circle and with the tangent t Q to the hyperbola is
(x4+y4)=a6
(a4+4y4) x2=a6
(a4+4x4) y2=a6
If two lines represented by ax3+bx2y+cxy2+dy3=0 are mutually perpendicular, then the slope of third line is
a/d
b/d
c/d
d/a
The slope of the radical axis of the circles x2+y2+3x+4y-5=0 and x2+y2-5x+5y-6=0 is
5
8
If y= a cos mx+b sin m=mx, then d2y/dx2=
–m2y
m2y
my2
my
The polar equation cos θ + 7 sin θ = 1/r represents a :
circle
parabola
straight line
hyperbola
The number of quadratic expressions with the coefficient drawn from the set (0, 1, 2, 3) is
21
36
48
64
If A lies in the third quadrant and 3 tanA – 4 = 0, then 5 sin2A + 3 sinA + 4 cosA is equal to
-24 / 5
24 / 5
48 / 5
nC0+nC1+nC2+………+nCn =
nn
n!
2n
2n!
The angle between the lines 4x-y+9=0, 25x+15y+27=0 is
π/2
π/4
π/6
The length of tangent from (0,0) to the circle 2(x2+y2)+x–y+5=0,is:
√5
√5/2
√2
(5/2)1/2
If 5 biscuits are distributed among 6 children, the probability that a particular child gets 4 sweets is
10C4/ 610
10C4*56/ 610
10C4+56/ 610
56/610
The number of common tangents to the two circles x2+y2-8x+2y=0 and x2+y2-2x-16y+25=0 is
2
4
A car starts from rest and attains the speed of 10km/hr,20km/hr respectively at the end of the first and second minutes.If the car moves on a straight road,the distance travelled in 2 miuntes is:
1/3 km
1/4 km
15km
20km
If x=-5+4i then x4+9x3+35x2-x+4=
-170
160
170
-160
The set of values of x for which the inequalities x2-3x-10<0 and 10x-x2-16>0 hold simultaneously is
(-2 , 5)
(2 ,8)
(-2 , 8)
The inverse point of (1, 2) w.r.t the circle x2+y2=25 is (5, k), then k=
10
12
22
40
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
4(cos3 200 +cos34 00) =
3(cos 200+cos 400)
3(cos 100+sin 200)
3(cos 200+sin 400)
3(cos 100+cos 200)
The equation of the auxiliary circle of x2/16-y2/25=1 is
x2+y2=16
x2+y2=9
x2+y2=5
x2+y2=15
The circle x2+y2=4x+8y+5=0 intersects the line 3x-4y=m at two distinct points if
-85
-35
15
35
d/dx{Tan-1x/√1-x2+Sec-11/√1-x2}=
1/2(1+x2)
2/√1-x2
3/1+x2
1/2√1-x2
The equation of the sphere with centre at (-1, 2, 3) and which passes through (1, -1, 2) is:
x2 + y2 + z2 + 2x – 4y – 6z – 14=0
x2 + y2 + z2 – 2x + 4y + 6z – 14=0
x2 + y2 + z2 + 2x – 4y + 6z=0
x2 + y2 + z2 + 2x – 4y – 6z =0
The lines r=(6-6s)a+(4s-4)b+(4-8s)c and r=(2t-1)a+(4t-2)b-(2t+3)c intersects at
4c
-4c
3c
-2c
A: The polar of (2, 3) with respect to the circle x2+y2-4x-6y+5=0 is 2x+3y=0 R: The polar of (x1, y1) with respect to the circle S=0 is S1=0
Both A and R are true and R is the correct explanation of A
Both A and R are true but R is not correct explanation of A
A is true but R is false
A is false but R is true
In the argand plane the area in square units of the triangle formed by the points1 + i, 1 –i, 2i is
The odds against an event is 5 to 2 and the odds in favour of another disjoint event are 3 to 5. Then the probability that one at least of the event will happen is
29/30
49/50
17/50
37/56
The equation of the circle of radius 3 that lies in the fourth quadrant and touching the lines x = 0 and y = 0 is
x2 + y2 -6x + 6y +9 =0
x2 + y2 -6x - 6y +9 =0
x2 + y2+ 6x - 6y +9 =0
x2 + y2+ 6x + 6y +9 =0
If cot θ - tan θ= sec θ, then θ =
nπ + (-1)n π/6
nπ + π/2
2nπ + 3π/2
The circle orthogonal to the three circles x2+y2+aix+biy+c=0, i=1, 2, 3 is
x2+y2-bix-aiy-c=0
x2+y2=c
x2+y2=ai+bi
x2+y2=c2
If A=(1,1) ,B=(4,5) and C=(6,13) then cos A=
64/63
63/65
56/36
36/56
The radius of the circle which touches y-axis at (0, 0) and passes through the point (b, c) is:
|b|/2(b2+c2 )
(b2+c2)/2
(b2+c2)/|2c|
(b2+c2)/|2b|
The equation of the hyperbola with its axes as coordinate axes, whose transverse axis 8 and eccentricity 3/2 is
x2/9-y2/4=1
x2/16-y2/20=1
x2/25-y2/11=1
x2/16-y2/9=1
In ΔABC, R2 (sin 2A+sin 2B+sin 2C)=
Δ
3Δ
2Δ
4Δ
If a=i+4j, b=2i-3j and c=5i+9j then c=
2a+b
a+2b
a+3b
3a+b
The system of circles orthogonal to x2+y2+2x+4y+7=0 is a member, then the equation of the orthogonal system is
(x2+y2+x+3y)+λ(2x+3y+3)=0
3(x2+y2+x+3y)+λ(x+y+3)=0
3(x2+y2-x-3y)+λ(x-y-3)=0
3(x2+y2+2x+3y)+3λ(2x+3y+63)=0
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
There are 3 routes from Tenali to Vijaywada and 4 routes from Vijaywada to Hyderabad,in how many different ways a person can travel from Tenali to Hyderabad via Vijaywada?
18
20
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 derivative of (ax+b)cx+d w.r.to x is
(ax+b)cx+d[[a(cx+d)/(ax+b)]+c log(ax+b)]
(ax-b)cx+d[[a(cx+d)/(ax+b)]+c log(ax-b)]
(ax+b)cx+d[[a(cx+d)/(ax+b)]+c log(ax-b)]
(ax-b)cx+d[[a(cx+d)/(ax+b)]+c log(ax+b)]
The line y = m(x + a)+a/m touch the parabola y2= 4a(x+ a) form
Is equal to 0
Is any positive real number
Is any negative number
Is any real number
A cylindrical gas container is closed at the top and open at the bottom. If the iron plate of the top is 5/4 times as thick as the plate forming the cylindrical sides, the ratio of the radius to the height of the cylinder using minimum material for the same capacity is
4/5
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
Equation of the parabola having focus (3,-2) and vertex (3,1) is
(y-1)2=-12(x-3)
(y-1)2=12(x+3)
(x-3)2=-12(y-1)
(x-3)2=12(y-1)
Let α,β be the roots of x2-x+p=0 and γ,δ be the roots of x2-4x+q=0.If α,β,γ,δ are in G.P then the integral values of p and q respectively,are
-2,-322
-2,3
-6,3
-6,-3
The length of the sub tangent of the curve 2x2+3xy-2y2=8 at (2, 3) is
√325/2
3√325/17
17/2
18/17
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 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 y= acos (log x)+b sin (log x) then x2y2+xy1+y=
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 x = sint; y = sin pt then (1-x2) (d2y/dx2) -x(dy/dx) +p2y =
1/√2
The equation of the tangents to a circle x2+y2-4x-6y-12=0 and parallel to 4x-3y=1 are
4x+3y+14=0, 4x+3y+16=0
4x-3y-24=0, 4x-3y+26=0
4x-3y+34=0, 4x-3y+16=0
If the circles x2+y2=4 and x2+y2-6x-8y+K=0 touch internally then K=
-24
24
17
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
From the point A(0,3) on the circle x2+4x+(y-3)2=0, a chord, AB is drawn and extended to a point P, such that AP = 2AB. The locus of P is
x2+4x+(y-3)2=0
x2+8x+(y-3)2=0
x2+4x-(y-3)2=0
x2+8x-(y-3)2=0
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
The equation of the tangents from the origin to x2+y2-6x-2y+8=0 are
x+y=0,7x+y=0
x-y=0,x+7y=0
x+y=0,x+7y=0
x=0,y=0
If α and β are two points on the hyperbola x2/a2-y2/b2=1 and the chord joining these two points passes through the focus (ae, 0) then e cos α-β/2=
cos α+β/2
cos α-β/2
cos 2α+2β/4
sin α+β/2
xn-1 is divisible by x-k. Then the least +ve integral value of K is
If f=x2yz+y2zx+z2xy then fxyz=
2x
2(x+y+z)
If cos θ - 4 sin θ = 1 then sin θ + 4 cos θ is equal to
±2
±4
The approximate percentage reduction in the volume of a cube of ice, if each side of the ice cube to reduced by 0.7% due to melting to:
2.1%
2.5%
3.2%
3.3%
If z= (λ+3)+i√(5-λ2), then the locus of z is a circle with centre at
(0,0)
(0,3)
(3,0)
(-3,0)
The values of the parameters a for which the quadratic equations (1-2a)x2-6ax-1=0 and ax2-x+1=0 have at least one root in common are
0,1/2
1/2,2/9
2/9
0,1/2,2/9
If one root of the quadratic equation ax2+bx+c=0 is 3-4i, then a+b+c is :
-20
The sum of the length of the sub tangents and subnormal at θ=π/3 on the cycloid x=a(θ-sinθ), y=a(1-cosθ) is
2a
2√a
2a/√3
a/√3
The locus of middle points of chords of the hyperbola 2x2-3y2=5 which passes through the point (1,-2) is
3x2-y2-x-4y=0
x2-3y2-4x-y=0
3x2-2y2-6x-2y=0
2x2-3y2-2x-6y=0
The angle between the lines whose direction cosines satisfy the equations l + m+ n =0, l2 + m2 – n2 = 0 is
π/3
The locus of middle point of the chord of the ellipse x2/a2+y2/b2=1 touching the ellipse The locus of midpoint of the chord of the ellipse x2/α2+y2/β2=1
α2x2/a4+β2y2/b4=( x2/a2+y2/b2)2
α2x2/a4+β2y2/b4=( x2/a2-y2/b2)2
α2x2/a4-β2y2/b4=( x2/a2-y2/b2)2
The equation of the line dividing the line segment joining the points (5, 3), (3, -3) in the ratio 5:3 externally and perpendicular to 2x+3y-5=0. Is
x+2y-12=0
5x-2y-10=0
3x-2y-24=0
5x-2y+4=0
If a, b and c are mutually perpendicular unit vectors, then [a b c]2=
If y= xsin x+(sin x)x then dy/dx=
e2
3/2
If the normal at (1,2) on the parabola again at the point (l2,2t), then the value of t is
-3
Tangent at any point of the curve (x/a)2/3+(y/b)2/3=1 makes intercepts x1and y1 on the axes. Then
(x1/a)2/3+(y1/b)2/3=1
x12/a2+y12/b2=1
x13/a3+y13/b3=1
None
If the product of two of the roots of x4-5x3+5x2+5x-6=0 is 3 then the roots are
1, -2, 4, -8
±1, 2, 3
±2i, 2, 3
-3/2, -1/3, 2± √3
The equations of the tangents drawn from the origin x2+y2+2gx+2fy+f2=0 is
x=0, (f2-g2)x-2fgy=0
x=0, (f2+2g2)x-2fgy=0
x=2, (2f2+3g2)x+2fgy=0
x=5, (3f2+5g2)x+2fgy=0
If the roots of 2x3-3x2+kx+6=0 are in A.P then k=
-5
7
-11
128 sin8 θ=
cos 8θ+8cos 6θ+28cos 4θ+56cos 2θ+35
cos 8θ+8cos 6θ-28cos 4θ+56cos 2θ+35
cos 8θ-8cos 6θ+28cos 4θ-56cos 2θ+35
cos 8θ+8cos 6θ-28cos 4θ-56cos 2θ+35
The perpendicular distance of the straight line 7x+24y=15 from the point of intersection of the lines 3x+2y+4=0, 2x+5y-1=0
1/2 unit
1/5 unit
2/3 unit
¾ unit
If the tangent at any point on the curve x4+y4=a4 cuts off intercepts p and q on the coordinates axes then p-4/3+q-4/3=
a-4/3
a-1/2
a1/2
a
If 3x /(x-a) (x-b) = 2/(x-a) + 1/(x-b) then a:b =
1 : 2
-2 : 1
1 : 3
3 : 1
The equation of the normal to the curve x2=4y at (2, 1) is
x+y+3=0
x+y-3=0
x-y+3=0
x-y-3=0
If r2=(x-a)2+(y-b)2 then rxx+ryy=
1/r
1/r2
r2
r
The angle between the tangents drawn from (0,0) to the circle x2+y2+4x-6y+4=0 is
Sin-1 5/13
Sin-1 5/12
Sin-1 12/13
If 5,-7,2 are the roots of lx3+mx2+nx+p=0 then the roots of lx3-mx2+nx-p=0 are
-7,-5,2
7,-5,-2
5,7,2
5,-7,-2