Gold number is used to show
Protective power of lyophillic colloids
Protective power of lyophobic colloid
Peptisation power of a colloid
Precipitation power of a colloid
If A and B are square matrices of size n x n such that A2 – B2 = (A – B)(A + B), then which of the following will be always true
A or B are null matrices
A or Bare unit matrices
A2 = A, B2 =B
AB =BA
The solution ofn(ex+1)y dy+(y+1)dx=0 is
ex+y=c(y+1)(ex+1)
ex+y=c(y+1)(ex-1)
ex+y=c(y-1)(ex+1)
ex+y=c(y-1)(ex-1)
The foot of the perpendicular from the point (3, 4) on the line 3x-4y+5=0 is:
(81/25, 92/25)
(92/25, 81/25)
(46/25, 54/25)
(-81/25, 92/25)
A boat is to be manned by 9 crew with 4 on the stroke side, 4 on the row side and one to steer. There are 11 crew of which 2 can stroke only, 1 can row only while 3 can steer only. In how many ways the crew can be arranged for the boat?
10
30
44
17280
If the points (2,4), (k,6) are conjugate with respect to the parabola y2 = 4x then k =
7/2
-12
-2
(2 cos23θ-1) cos 5θ=
1/2[cos 11θ+cos θ]
1/2[sin 11θ+sin θ]
1/2[sin 11 θ+cos θ]
1/2[cos 11θ+sin θ]
Two charges of 50 μC and 100 μC are separated by a distance of 0.6m. The intensity of electric field at a point midway between them is
50x106V/m
5x106V/m
10x106V/m
10x10-6V/m
Two particles P and Q are located at distance rp and rq respectively from the centre of a rotating disc such that rp > rq
Both P and Q have the same acceleration
Both P and Q do not have any acceleration
P has greater acceleration than Q
Q has greater acceleration than P
I : If cos α + cos β + cos γ = 3 then sin α + sin β + sin γ = 0 II: If sin α + sin β + sin γ = 3 then cos α + cos β + cos γ = 0
Only I is true
Only II is true
Both I & II are true
Neither I nor II are true
The equation of the circle whose diameter is the common chord of the circlesx2 + y2 + 2x + 3y + 2 = 0 and x2 + y2 + 2x-4y-4 = 0 is
x2 + y2 + 2x + 2y + 2 = 0
x2 + y2 + 2x + 2y-l =0
x2 + y2 + 2x + 2y + l =0
x2 + y2 + 2x + 2y+ 3= 0
The equation of the plane passing through the points (3, -5, -1), (-1, 5, 7) and parallel to the vector (3, -1, 7) is
3x-y+7z=0
3x+2y-z=0
3x-5y-z=0
x-5y-7z=0
In a ∆ABC , ∑(b+c) tan a/2 tan(b-c)/2 is equal to
a
b
c
0
In a photoelectric cell, wavelength of the incident light is changed from 4000A0 to 3600A0. Change in stopping potential will be nearly
0.14V
0.24V
0.34V
0.44V
The point dividing the join of (3, -2, 1} and (-2, 3, 11) in the ratio 2 : 3 is :
(1, 1, 4)
(1, 0, 5)
(2, 3, 5)
(0, 6, -1)
Carbogen to
pure form of carbon
COCl2
mixture of CO and CO2
mixture of O2 and CO2
A particle moves on a line according to the law s=at2+bt+c. if the displacement after one second is 16 cm, the velocity after 2 second is 24 cm/sec and the acceleration is 8 cm /sec2, then (a, b, c)=
(4, 8, 4)
(4, 4, 8)
(8, 4, 4)
(8, 8, 4)
If the roots of x2-2(5+2k)x+3(7+10k)=0 are equal then k=
1/2,1
-1/2,1
2,1/2
2,-1/2
In ΔABC, if sin A: sin C = sin (A-B) :sin (B-C), then a2,b2,c2 are in
A.P
H.P
G.P
none
The probabilities of a problem being solved by two students are 1/2 and 1/3.The probability that the problem being solved is
2/3
1/6
1/2
1/3
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)
Two satellites A and B go around the earth in a circular orbits at a height of RA and RB respectively from the surface of the earth. Assume the earth to be a uniform sphere of radius RE. The ratio of magnitudes of the velocities of the statellites VA/VB =
√RB/RA
RB + RE/(RA +RE)
√(RB + RE)/(RA + RE)
√RA /RB
If (x1,y1), (x2,y2),(x3,y3)are the vertices of an equilateral triangle such that(x1-2)2+( y1-3)2=( x2-2)2+( y2 -3)2=(x3-2)2+(y3 -3)2thenx1+ x2+x3=
18
24
6
8
The coefficient of x2 in1+x2/(1-x)3 is
3
4
7
12
In which of the following reactions the product is an ether
C6H6 + CH3COCl/anhydrous AIC13
C2H5C1 + aq. KOH
C6H6 + C6H5COCl/anhydrous AICI3
C2H5C1 + C2H5ONa
The term in the independent of x in the expansion of (3+2x)44, is
4th term
5th term
1st term
7th term
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
If x= a {cos θ + log tan (θ/2)} and y = a sin θ then dy/dx=
cot θ
tan θ
sin θ
cos θ
If y= acos (log x)+b sin (log x) then x2y2+xy1+y=
1
2
The 3rd term of 4 (3x-y3)is
4C2(3x)2(-y3/6)2
4C2(3x)2(-y2/6)2
4C2(3x)3(-y3/6)2
4C2(3x)3(-y2/6)2
Increasing the conc. of the reactant by 27 times, the rate increases by 3 times. What is the order of the reaction?
1.33
In measuring the vertical angle of the sector of acircle of radius 30cms, an error of 10 is made. The error in the area of the sector is
2.5π sq.cms
25 π sq.cms
3π sq.cms
30 π sq.cms
If A+B+C =900 then (cot A+cot B+cot C)/(cot A cot B cot C) =
If f(x)= (a-xn)1/n, where a>0 and n?N, then (fof)(x)=
x
xn
an
when a wave traverses a medium , the displacement of a particle located at 'x' at a time 't' is given by y=a sin (bt - cx) , where a,b and c are constants of the wave , which of the following is a quantity with dimensions
y/a
bt
cx
b/c
Which term of (2x-3y)12 when x=1, y=5/2 numerically greatest?
9
11
Water is being poured into the inverted conical vessel at the rate of 1.5 cubic meter per minute. Its depth is always equal to twice its radius. The level of water is rising at the rate of 3/8π meter per minute when its depth is
1mt
2mt
3mt
4mt
If PM is the perpendicular from P (2, 3) onto the line x + y = 3, then the co-ordinates of M are
(2, 1)
(-1,4)
(I, 2)
(4,-1)
If the circles x2+y2+2x-2y+4=0 cuts the circle x2+y2+4x-2fy+2=0 orthogonally, then f=
-1
cos 240 cos 480 cos 960 cos 1680 =
1/4
1/8
1/16
1/32
The displacement of a particle moving in a straight line is given by x = 2t2+t+5 where x is expressed in meter and 't' in second.The acceleration at t = 2sec is
4 m/s2
8 m/s2
10 m/s2
15 m/s2
d/dx {Tan-14x/1+5x2+Tan-12+3x/3-2x}=
1/1+25x2
5/1+25x2
1/1+5x2
5/1+5x2
The heat of formation of HI from the equation H2+I2→2HI,ΔH=+52 KJ is
-26 KJ
+26 KJ
-52 KJ
+52 KJ
The curve whose subtangent is twice the abscissa of the point of contact and passing through (1,2) is
y2=4x
y2=-4x
x2=4y
x2=-4y
An ideal gas at a pressure of 1 atm and temperature of 270C is compressed adiabatically until its pressure becomes 8 times the initial pressure, then final temperature is : (γ = 3/2)
6270C
3270C
4270C
41.250 C
If a line makes an intercept PQ between the pair of lines x2-4xy+2y2=0 and if (-1,1) is the midpoint of PQ then the equation of PQ is
3x-4y-7=0
3x+4y+1=0
4x-3y-7=0
X+3y-1=0
In 0.01 M solution,HCN is 0.01% ionized. Its dissociation constant is
10-6
10-10
10-3
10-5
Coefficient of x50 in (1+x)1000+2x(1+x)999+3x2(1+x)998+……..+1001x1000 is
1001C50
1000C50
1002C50
1002C51
If the circles x2+y2=3a2 , x2+y2-6x-8y+9=0 touch externally then a=
21
16
If y2=(x-a)(x-b) then d3/dx3[(d2y/dx2)-2/3]=
If y = e-12x Cos (5x+2) then yx =
(169)x e-12x Cos [5x+2-n Tan-1(5/12)]
13x e-12x Cos [5x+2-n Tan-1(5/12)]
(13)x e12x Cos [5x+2-n Tan-1(5/12)]
(13)x e-12x Sin [5x+2-n Tan-1(5/12)]
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
If x2+y2=a2 then (1+y12)3/2/|y2|=
a2
1/a
If A+B+C= 1800 then sin3 A cos (B-C)+ sin3 B cos (C-A)+ sin3 C cos (A-B)=
2 sin A sin B sin C
3 sin Acos B sin C
2 cos A cos B cos C
3sin A sin B sin C
The ratio in which (2,3) divides the line segment joining (4,8), (-2,-7) is
2:1 externallz
2:3
4:3 externally
1:2
If the number of common tangents of the circles x2+y2+8x+6y+21=0, x2+y2+2y-15=0 are 2,then the point of their intersection is
(8,5)
(8,-5)
(-8,-5)
(-4,-3)
An ideal gas is subjected to a cyclic process involving four thermodynamic states; the amounts of heat (Q) and work (W) involved in each of these states are
500 , 7.5%
700, 10.5%
1000, 21%
1500 , 15%
The centroid of the triangle formed by the points (2,3,-1), (5,6,3),(2,-3,1) is
(2,-1,3)
(-2,1,3)
(2,1,-3)
(3,2,1)
There are 25 railway stations between Nellore and Hyderabad.The number of different kinds of single second class tickets to be printed so as to enable a passenger to travel from the station to another is
28P2
27P2
26P2
25P2
if f(x)=a2x-a-2x/a2x+a-2x, then f(x) is
even
odd
none of these
cannot be determined
If the area of the triangle with vertices (2a,a), (a,a), (a,2a) is 18sq.unit5, then the circumcentre of the triangle is
(3,3)
(6,6)
(9,9)
(0,0)
The foci of the hyperbola 2x2-y2-4x+4y-10=0 are
(±√13, 0)
(1±2√3, 2)
(2±3√3, 3)
(3±3√3, 2)
If a tangent to the circle x2+y2+4x-4y+4=0 makes equal intercepts on the coordinate axes then the equation of that tangent is
x+y=2
x+y=√2
x+y=2√2
x+y=1
The magnitude of maximum acceleration is π times that of maximum velocity of a simple harmonic oscillator. The time period of the oscillator in seconds is
0.5
2.C0+22.C1/2+23.C3/3+……..+2n+1.Cn/n+1 =
1/n+1
4n/n+1
3n+1-1/n+1
4n+1-1/n+1
The equation of the asymptotes of the hyperbola 4x2-9y2=36 are
2x±3y=0
2x±5y=0
2x±6y=0
2x±8y=0
When a liquid is heated in copper vessel its Coefficient of apparent expansion is 6x10-6/0C.When the same liquid is heated in a steel vessel its coefficient of apparent expansion is 24x10-6/0C If coefficient of linear expansion for copper is 18x10-6/0C the coefficient of linear expansion for steel is
20x10-6/0C
24x10-6/0C
36x10-6/0C
12x10-6/0C
If 2x2-3xy+y2=0 represents two sides of a triangle and lx+my+n=0 is the third side then the locus of incentre of the triangle is
3x2+2xy-3y2=0
2x2+3xy+y2=0
3x2-2xy-3y2=0
2x2-3xy-2y2=0
A train approaching a level crossing at a speed of 20m/s sounds a horn of frequency 628Hz when 80m form the crossing.A person is standing at 60m from the level crossing on a road which is perpendicular to the railway track.Then the apparent frequency heard by the person is (velocity of sound in air is 330m/s)
660Hz
680Hz
640Hz
690Hz
The points at which the tangent to the circle x2 + y2=13 is perpendicular to the line 2x + 3y +21=0 is:
(3, 2)
(3,-2)
(2, -3)
(2, 3)
138 g of ethyl alcohol is mixed with 72 g of water. The ratio of mole fraction of alcohol to water is
3:4
1:4
1:1
Aniline when heated with NaNO2 and HCl at 0.50C the product formed is:
chloro aniline
benzene diazonium chloride
chloro benzene
dichloro benzene
The lines 2x+y-1=0, ax+3y-3=0, 3x+2y-2=0 are concurrent
for all a
for a=4 only
for -1≤a≤3
for a>0 only
The velocity of a listener who is moving away from a stationary source of sound such that the listener notices 5% apparent decrease in frequency of sound is(Velocity of sound in air=340ms-1)
12.5ms-1
17ms-1
25ms-1
34ms-1
A current is passed through two coils connected in series. The potential difference across the first coil is 3 volts and that of the second coil 4.5 volts. If the first coil has resistance of 2 ohm, the resistance of the second coil is:
3Ω
5Ω
7Ω
9Ω
The maximum value of x3-3x in the interval [0,2] is:
(sin 5θ)/(sin θ)=
16cos4θ-12cos2θ+1
16cos4θ+12cos2θ+1
16cos4θ-12cos2θ-1
16cos4θ+12cos2θ-1
The heat of formation (ΔHf) of H2O(g) is -243 KJ.ΔE of it at temperature T is
-243+RT
-243RT
-243+1/2RT
-243-1/2 RT
H3O++OH-→2H2O
Arrhenius neutralization
Bronsted neutralization
Lewis neutralization
Both Lewis neutralization and Bronsted neutralization
Which one of the following reactions does not form gaseous product
PbO2 + H2O2 →
Acidified KMnO4 + H2O2 →
PbS + H2O2 →
Cl2 + H2O2 →
One extremity of a focal chord of y2=16x is A(1,4). Then the length of the focal chord at A is
25/4
25/2
15/2
25
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
A glass tube 1.5m long and open at both ends, is immersed vertically in a water tank completely. A tuning fork of 600Hz is vibrated and kept at the upper end of tube and tube is gradually raised out of water.The total number of resonances heard before when the tube comes out of water, taking velocity of sound as 330m/sec. is
The maximum value of sin2 x+ 2 sin x+3 is
If(1.5)n=(0.15)b=100, then 1/a-1/b is equal to:
In the Argand plane, the points represented by the complex numbers 2-i,-4+3i and -3-2i form
right angle triangle
equilateral triangle
isosceles triangle
right angled isosceles triangle
If the earth suddenly stops rotating, the value of g at equator would :
decrease
remain unchanged
increase
become zero
The circumcentre of the triangle formed by 3x+4y-20=0 with the pair of lines 2x2-3xy-2y2=0 is
(2,3)
(3,2)
(0,5)
A molecule (X ) has (i) four sigma bonds formed by the overlap of sp2 and s orbitals (ii) one sigma bond formed by sp2 and sp2 orbitals and (iii) one π bond formed by px and pz orbitals. Which of the following is X ?
C2H6
C2H3Cl
C2H2Cl2
C2H4
Which one of the following is used in the preparation of styrene?
CH3CHO
P2O5
CH4
C6H6
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
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 distance of the point (1,2) from the common chord of the circles x2+y2-2x-6y-6=0 and x2+y2+6x-16=0 is
1/5
5
The equation to the image of the pair of lines ax2+2hxy+by2=0 w.r.t y=0 is
bx2+2hxy+ay2=0
bx2-2hxy+ay2=0
ax2-2hxy+by2=0
ax2+2hxy+by2=0
The radical axis of co-axial system of circle with the limiting points (1, 2) and (4, 3) is given by in equation
3x-y+10=0
3x+y-10=0
3x+y+10=0
x+3y-10=0
Which of the following compounds when heated with CO at 150"C and 500 atm pressure in presence of BF3 forms ethyl propionate ?
C2H5OH
CH3OCH3
C2H5OC2H5
CH3OC2H5
The chord of contact of tangents drawn from points on x2/a2+y2/b2=1 to the circle x2+ y2=c2 touches the ellipse
a2x2-b2y2=c4
a2x2+b2y2=c4
a2x2+b2y2=c2
b2x2+a2y2=c4
The condition that the circles (x-α)2+(y-β)2=r2, (x-β)2+(y-α)2=r2 may touch each other is
α2+β2=r2
α2+β2=2r2
(α-β)2=2r2
(α-β)2=r2
The nearest point on the line 2x-y+5=0 from the origin is
(2,-1)
(-2, 1)
(-2, -1)
Work done by 0.1 mole of gas at 270C when it expands to double its volume at constant pressure is : (assume R = 2 cal/mol-1 K-1)
600 cal
42 cal
60 cal
546 cal