The number of significant figures in 0.06900 is
A. 5
B. 4
C. 2
D. 3
Rules for Counting Significant Figures
(i) All the non-zero digits are significant. In 1.248, the
number of significant figures is 4.
(ii) All the zeroes between two non-zero digits are
significant, no matter where the decimal point is, if at
all. As examples, 406 and 9.001 have 3 and
4 significant figures respectively.
(iii) If the measurement of number is less than 1, the
zero(es) on the right of decimal point and to the left
of the first non-zero digit are non-significant.
In 0.00606, first three underlined zeroes are
non-significant and the number of significant figures
is only 3.
(iv) The terminal or trailing zero(es) in a number
without a decimal point are not significant. Thus,
12.3 =1230cm=12300 mm has only 3 significant
figures.
(v) The trailing zero(es) in number with a decimal point
are significant. Thus, 3.800 kg has 4 significant
figures.
(vi) A choice of change of units does not change the
number of significant digits or figures in a measurement.
So, here using rule (iii) and (v) we get, in 0.06900
-
0.06900 the underlined part is not significant and the bold part is significant.
Therefore, the number of significant figures is 4.
The sum of the numbers 436.32, 227.2 and 0.301 in appropriate significant figures is
A. 663.821
B. 664
C. 663.8
D. 663.82
Rules for Adding Significant Figures
(i) Count the number of significant figures in the decimal portion of each given number.
(ii)The digits to the left of the decimal place are not used to determine the number of decimal places in the final answer.
(iii) Add or subtract the given numbers in the normal way.
(iv) Round the answer to the LEAST number of places in the decimal portion of any number in the problem.
Here,
436. 32
+ 227. 2
+ 0. 301
663. 821
Here, 436.32 has 2 digits after decimal, 227.2 has 1 digit after decimal and 0.301 has 3 digits after decimal. According to rules the final result will have the least no. of digit after decimal i.e. 1 here.
Therefore, the final sum is 663.8
The mass and volume of a body are 4.237 g and 2.5 cm3, respectively. The density of the material of the body in correct significant figures is
A. 1.6048 g cm–3
B. 1.69 g cm–3
C. 1.7 g cm–3
D. 1.695 g cm–3
RULES OF DIVISION IN SIGNIFICANT FIGURES:
(i)In division the answer is rounded off to the same number of significant figures as possessed by the least precise term used in the calculation.
(ii)The final result must contain as many significant figures as are in the original number with the least significant figures.
Here,
No. of significant figures in 4.237 is 4 and in 2.5 is 2. Here 2.5 is the least precise term used. Therefore, the answer must contain 2 significant figures.
Now, applying the rules and rounding off the answer we get
The numbers 2.745 and 2.735 on rounding off to 3 significant figures will give
A. 2.75 and 2.74
B. 2.74 and 2.73
C. 2.75 and 2.73
D. 2.74 and 2.74
RULES OF ROUNDING OFF MEASUREMENT:
1. If the digit after the digit to be rounded off is less than 5, then the preceding digit remains same.
2. If the digit after the digit to be rounded off is more than 5, then the preceding digit increases by one.
3. If the digit after the digit to be rounded off is 5 followed by digits other than zero, then the preceding digit increases by one.
4. If the digit after the digit to be rounded off is 5 and the no. to be rounded off is even, then the number to be rounded off remains same.
Example- 1.285 becomes 1.28 after rounding off
5. If the digit after the digit to be rounded off is 5 and the no. to be rounded off is odd, then the number to be rounded off increases by one.
Example- 1.215 becomes 1.22 after rounding off
Now, here in the given question,
According to rule (4),
2.745 after rounding off becomes 2.74 as 4 is even number.
And
According to rule (5),
2.735 after rounding off becomes 2.74 as 3 is odd number.
The length and breadth of a rectangular sheet are 16.2 cm and 10.1cm, respectively. The area of the sheet in appropriate significant figures and error is
A. 164 ± 3 cm2
B. 163.62 ± 2.6 cm2
C. 163.6 ± 2.6 cm2
D. 163.62 ± 3 cm2
(i)In multiplication the answer is rounded off to the same number of significant figures as possessed by the least precise term used in the calculation.
(ii)The final result must contain as many significant figures as are in the original number with the least significant figures.
No. of significant figures in 16.2 is 3 and in 10.1 is 3. Here both are the least precise terms used. Therefore, the answer must contain 3 significant figures.
So, rounding off the answer to 3 significant figures we get
Now error,
If is the error in the area, be the error in length and be the error in breadth, then relative error is calculated as .
(For the formula part refer to
NCERT class 11 part 1 unit
and measurement chapter)
In dimensional analysis, in multiplication the answer is rounded off to the same number of significant figures as possessed by the least precise term used in the calculation. Here 0.1 has least precision and has 1 significant figure. Therefore,
(By rounding off to one significant figure)
Area,
Which of the following pairs of physical quantities does not have same dimensional formula?
A. Work and torque .
B. Angular momentum and Planck’s constant.
C. Tension and surface tension.
D. Impulse and linear momentum.
Most physical quantities can be expressed in terms of combination of five basic dimensions. These are,
1.mass(M)
2.length(L)
3.time(S)
4.electrical current(I) and,
5.temperature ()
For,
(a) Work and torque
From the table above we can see that only pair having different dimensional formula is tension and surface tension.
Measure of two quantities along with the precision of respective measuring instrument is A = 2.5 m s–1 ± 0.5 m s–1 B = 0.10 s ± 0.01 s The value of A B will be
A. (0.25 ± 0.08) m
B. (0.25 ± 0.5) m
C. (0.25 ± 0.05) m
D. (0.25 ± 0.135) m
Given,
Let, X=AB
X=AB=
Precision can be calculated by,
If is the error in the X, be the error in A and be the error in B, then relative error is calculated as .
Therefore now,
(For the formula part refer to
NCERT class 11 part 1 unit
and measurement chapter)
Rounding off 0.075 to two significant figures we get,
Therefore, the value of AB is .
You measure two quantities as A = 1.0 m ± 0.2 m, B = 2.0 m ± 0.2 m. We should report correct value for as:
A. 1.4 m ± 0.4 m
B. 1.41m ± 0.15 m
C. 1.4m ± 0.3 m
D. 1.4m ± 0.2 m
Let
Let be the error in X.
From error analysis we know that,
(For the formula part refer to
NCERT class 11 part 1 unit
and measurement chapter)
Putting the known values we get,
In dimensional analysis, in multiplication the answer is rounded off to the same number of significant figures as possessed by the least precise term used in the calculation. Here 0.1 has least precision and has 1 significant figure. Therefore,
(By rounding off to one significant figure)
Which of the following measurements is most precise?
A. 5.00 mm
B. 5.00 cm
C. 5.00 m
D. 5.00 km.
Precision means closeness of two or more measurements.
If measured with an instrument of minimum least count the measurement is most precise.
Here mm scale has the minimum least count and hence is most precise.
The mean length of an object is 5 cm. Which of the following measurements is most accurate?
A. 4.9 cm
B. 4.805 cm
C. 5.25 cm
D. 5.4 cm
A measurement is said to be accurate if its value is closest to the real value of the physical quantity.
Here,
4.9 has the least difference. Hence 4.9 is most accurate.
Young’s modulus of steel is 1.9 × 1011 N/m2. When expressed in CGS units of dynes/cm2, it will be equal to (1N = 105 dyne, 1m2 = 104 cm2)
A. 1.9 × 1010
B. 1.9 × 1011
C. 1.9 × 1012
D. 1.9 × 1013
Given,
Substituting the values of and we get,
If momentum (P), area (A) and time (T) are taken to be fundamental quantities, then energy has the dimensional formula
A. (P1 A–1 T1)
B. (P2 A1 T1)
C. (P1 A–1/2 T1)
D. (P1 A1/2 T–1)
According to question, momentum area and time are taken as fundamental quantities.
Now, we know that dimension of
Momentum(p)=
Area(A)=
Time (T)=
Energy=
Let us suppose,
E=
Now using principal of homogeneity, which states that the dimensions on both sides of a dimensional equation is same, we get
=
Equating the like terms we get
a=1, a+2b=2, -a+c=-2
1+2b=2, -1+c=-2
2b=1, c=-1
a=1, b=1/2, c=-1
Therefore,
E=
On the basis of dimensions, decide which of the following relations for the displacement of a particle undergoing simple harmonic motion is not correct:
A. y = a sin 2 / πt T
B. y = a sin vt.
C. y = sin ()
D. y = a√2 (sin – cos )
Dimensional formula of displacement =
From study of dimensional analysis we know that,
Numbers have no dimension.
Trigonoetric functions are dimensionless.
Constants are dimensionless.
According to above rules
Dimension of
Dimension of
Dimension of
Dimension of
So, only option is C that doesn’t have dimension that of displacement.
If P, Q, R are physical quantities, having different dimensions, which of the following combinations can never be a meaningful quantity?
A. (P – Q)/R
B. PQ – R
C. PQ/R
D. (PR – Q2)/R
E. (R + Q)/P
Given,
P, Q, R have different dimensions.
From dimensional analysis we know that physical quantities having different dimensions cannot be added or subtracted.
From the above arguments we can conclude that, the combinations in option (a) and (e) are not dimensionally possible.
On the other hand,
In option (b) the product of P and Q may result into dimension of R.
Option (c) is also dimensionally possible as physical quantities with different dimensions can multiplied or divided.
In option (d) the product of P and R may result into dimension of Q2.
Photon is quantum of radiation with energy E = hν where ν is frequency and h is Planck’s constant. The dimensions of h are the same as that of
A. Linear impulse
B. Angular impulse
C. Linear momentum
D. Angular momentum
According to plank, the energy of photon is given by the expression,
Where,
f= frequency of light
h= Planck’s constant
Dimension of E=
Dimension of f=
So, dimension of h,
Now,
Linear impulse=forcetime
Angular impulse= torque time
=
=
Linear momentum= mass velocity
=
=
Angular momentum= moment of inertia angular velocity
=
=
If Planck’s constant (h ) and speed of light in vacuum (c ) are taken as two fundamental quantities, which one of the following can, in addition, be taken to express length, mass and time in terms of the three chosen fundamental quantities?
A. Mass of electron (me)
B. Universal gravitational constant (G)
C. Charge of electron (e)
D. Mass of proton (mp )
According to plank, the energy of photon is given by the expression,
Where,
f= frequency of light
h= Planck’s constant
Dimension of E=
Dimension of f=
So, dimension of h,
As we can see in the question, we have to relate M, L and T in terms of h and c as fundamental quantities.
There is no charge or ampere dimension so option (c) is eliminated.
We have to check for option a, b and d.
Dimensions of me, mp and G are , and respectively.
For me and mp,
For mass, let
m
By substituting the dimension for each quantity
Now using principal of homogeneity, which states that the dimensions on both sides of a dimensional equation is same, we get
=
Equating like terms and solving above we get,
a+b=1, 2b+c=0, -b-c=0
a=1, b=0, c=0
Substituting the values in equation,
m
m=me
Similarly for length,
l
=
Solving we get,
and for time,
This holds true for both me and mp.
And similarly for G,
Also we know,
Dimension of G=
Let,
m ...........(1)
By substituting the dimension for each quantity
Now using principal of homogeneity, which states that the dimensions on both sides of a dimensional equation is same, we get
=
Equating like terms and solving above we get,
a-c=1, 2a+b+3c=0, -a-b-2c=0
a=1/2, b=1/2, c=-1/2
Substituting the values in equation,
m
Similarly for length and time,
and
Which of the following ratios express pressure?
A. Force/ Area
B. Energy/ Volume
C. Energy/ Area
D. Force/ Volume
Dimensional formula of pressure=
Thus, A and B have dimensions of pressure.
Which of the following are not a unit of time?
A. Second
B. Parsec
C. Year
D. Light year
Second – It is a unit of time.
Parsec – It is a unit of distance which is equal to 3.26 light year.
Year – It is a unit of time which is equal to 31536000 seconds.
Light year- It is a unit of distance. It is defined as distance covered by light in 1 year. i.e.
Why do we have different units for the same physical quantity?
We have different units for same physical quantity for our convenience.
Let us suppose we have to measure a distance between two atoms in a molecule we will probably work in Angstrom(Å) and in another scenario we have to calculate distance between stars so we will probably work in light year.
Therefore in both cases the physical quantity used is length but the units are different. So, the point is that the units can vary for different measurements but dimensions remains same for the physical quantity.
The radius of atom is of the order of 1 Å and radius of nucleus is of the order of Fermi. How many magnitudes higher is the volume of atom as compared to the volume of nucleus?
According to question,
Radius of nucleus is of the order 1 Fermi i.e.
We know,
From classical physics, the shape of atom and nucleus is considered to be spherical.
And we know that the volume of sphere =
So, we get that atom is times bigger than nucleus.
Name the device used for measuring the mass of atoms and molecules.
Mass spectrometer is used for measuring the mass of atoms and molecules.
The method used for measuring the mass is known as mass spectrometry.
Fig 1. Mass Spectrometer
Express unified atomic mass unit in kg.
One unified atomic mass unit is defined as mass of one atom of C-12.
We know that molar mass of C-12 atom=12 gm/mole
mass of 1 atom=
And 1unified mass unit=
=
. A function F(θ) is defined as
F (θ) = 1 – θ + - +
Why is it necessary for θ to be a dimensionless quantity?
In dimensional analysis, according to rule a physical quantity can be added or subtracted if and only if the physical quantities have same dimension.
For example, we can add 5 kg apple and 5 kg watermelon but cannot add 5 kg apple and 100 metre race because they have different dimensional unit.
Similarly, in the given question 1 has no unit and dimension. Therefore, θ should also not have any unit and dimension in order to be added with 1. Hence θ is a dimensionless quantity.
Why length, mass and time are chosen as base quantities in mechanics?
In mechanics we have to deal with all the physical changes happening around us like force, pressure, momentum which are not fundamental quantities.
They are obtained from some physical quantities which are fundamental quantities.
Length mass and time are chosen as base quantities due to following reasons:
1. These quantities cannot be derived from other quantities.
2. They are the simplest units.
3. All other physical quantities can be written in terms of these units.
(a) The earth-moon distance is about 60 earth radius. What will be the diameter of the earth (approximately in degrees) as seen from the moon?
(b) Moon is seen to be of ( �)° diameter from the earth. What must be the relative size compared to the earth?
(c) From parallax measurement, the sun is found to be at a distance of about 400 times the earth-moon distance. Estimate the ratio of sun-earth diameters.
(a) Given:
Distance between earth and moon = 60 x earth’s radius
The distance between the earth and moon can be treated as a radius of arc that is subtended by the diameter of the earth from the moon. Let θ be the angle subtended by the arc, R be the earth-moon distance and RE be the earth’s radius. Then,
2RE = length of the arc.
And distance between earth and moon = 60RE
Therefore the angle subtended by the arc
Therefore the diameter of earth as seen from earth will be 2°.
(b) Given:
Diameter of moon as seen from earth =
As calculated before the diameter of earth as seen from moon is approximately 2° and if moon is as seen from earth, then,
Therefore, earth’s diameter is 4 times that of moon’s diameter.
(c) Given:
Distance between sun and earth = 400 x earth-moon distance.
let rm � be the moon’s distance from earth and rS be the sun’s distance from earth, then we have
Let Ds, Dm � and De be the diameters of sun, moon and earth respectively. Since we know that the sun and the moon, appear to be the same size from the earth, we have
Also
Therefore, the sun’s diameter is 100 times larger than earth.
Which of the following time measuring devices is most precise?
(a) A wall clock.
(b) A stop watch.
(c) A digital watch.
(d) An atomic clock. Give reason for your answer.
The correct answer is (d). An atomic clock is based on the characteristic frequencies of radiation emitted by atoms of certain elements which have a precision of about 1s in 3 x 105 years. However, a wall clock can measure correctly up to one second, a stop watch can measure correctly about a fraction of a second and digital clock can also measure correctly up to about a fraction of second.
The distance of a galaxy is of the order of 1025 m. Calculate the order of magnitude of time taken by light to reach us from the galaxy.
Given:
Distance of galaxy from earth = 1025 m
We know that the speed of light in vacuum or space is 3 x 108 m/s.
Therefore, the time taken by light to reach earth from the galaxy can be calculated as follows
Therefore, the order of magnitude of time taken by light to reach is 1016s.
The Vernier scale of a travelling microscope has 50 divisions which coincide with 49 main scale divisions. If each main scale division is 0.5 mm, calculate the minimum inaccuracy in the measurement of distance.
Given:
Number of Vernier scale divisions (VSD) = 50
Number of Main scale divisions (MSD) = 49
Least count of main scale = 0.5 mm
As per the question 50 VSD coincide with 49 MSD, therefore
The minimum accuracy in measurement is given as
But, 1 MSD = 0.5 mm
Therefore, the minimum accuracy in measurement is 0.01 mm
During a total solar eclipse the moon almost entirely covers the sphere of the sun. Write the relation between the distances and sizes of the sun and moon.
During an eclipse, the moon entirely covers the sphere of the sun, therefore it can be said that both moon and the sun appear the same size form earth or they subtend the same solid angle on earth. Let ω be the solid angle subtended on earth, in which case we have,
where Asun and Amoon, are the projected areas of the sun and moon as seen from earth and Rse, and Rme � are the distances of sun and moon from earth. Let Rsun and Rmoon be the radii of the sun and the moon.
Then we have
Therefore, the distances of sun and moon are relative to their sizes.
If the unit of force is 100 N, unit of length is 10 m and unit of time is 100 s, what is the unit of mass in this system of units?
Given:
A unit of force = 100 N
A unit of length = 10 m
A unit of time = 100 s
The dimensional formula for Force is, F = [MLT-2].
Therefore mass, M = [FL-1T2].
Substituting the values force, length and time in the above relation we have
Therefore, in this system of units the unit of mass is 105 kg
Give an example of
(a) a physical quantity which has a unit but no dimensions.
(b) a physical quantity which has neither unit nor dimensions.
(c) a constant which has a unit.
(d) a constant which has no unit.
(a) The physical quantity plane angle θ = has a unit radian but no dimensions as it is defined as relation of Length over radius which both have the same dimensions.
(b) Specific density is defined as the ratio of density of a substance to density of water. Thus, both quantities having the same dimensions and units, specific gravity has neither unit nor dimensions.
(c) The gravitational constant G = 6.67408 x 10-11 m3 kg-1 s-2, thus has a unit.
(d) The constant Reynold’s number (R) used in fluid mechanics has no unit.
Where ρ is the density of the fluid, v is the velocity, d is the diameter of the pipe in which the fluid is flowing and μ is the viscosity of the fluid.
Calculate the length of the arc of a circle of radius 31.0 cm which subtends an angle of at the centre.
Given:
Radius of circle R = 31.0 cm
Angle subtended by arc L =
We know that the angle θ subtended by an arc of length L at the centre of circle of radius R is given by
Therefore, the length of the arc is 16.23 cm
Calculate the solid angle subtended by the periphery of an area of 1cm2 at a point situated symmetrically at a distance of 5 cm from the area.
Given:
Area of periphery =1 cm2
Radial distance of point = 5 cm
We know that the solid angle ω subtended by an object is given by
Therefore, the solid angle subtended is 0.04 steradian.
The displacement of a progressive wave is represented by y = A sin(wt – k x ), where x is distance and t is time. Write the dimensional formula of (i) ω and (ii) k.
Given:
Equation for wave y = A sin(ωt – kx)
We know that the argument for the sine function is always in degrees or radians and therefore dimensionless. And we know that only dimensionally like quantities can be added or subtracted, therefore the quantities ωt and kx must be dimension less, therefore
but t =
Similarly,
But x =
Therefore, the dimensional formulas are (i) ω = [M0L0T-1] and (ii) k =[M0L-1T0]
Time for 20 oscillations of a pendulum is measured as t1= 39.6 s; t2= 39.9 s; t3= 39.5 s. What is the precision in the measurements? What is the accuracy of the measurement?
Given:
Time measurement for 20 oscillations of a pendulum
t1=39.6s
t2=39.9s
t3=39.5s
Since, all the measurements have a maximum of on decimal place, the lease count of the instrument used to measure the time is 0.1s.
Since precision in measurement is equal to the least count of the instrument, therefore
Now the mean value of time period of the pendulum for 20 oscillations:
Now mean time period for one oscillation:
Now accounting for the precision in measuring time for one oscillation we have the measured mean time period
Now the accuracy in measurement is given by the maximum observed error from the measured value, which is
A new system of units is proposed in which unit of mass is α kg, unit of length β m and unit of time γ s. How much will 5 J measure in this new system?
Given
New unit of mass = α kg
New unit of length = β m
New unit of time = γ s
Magnitude of energy in original system n = 5J
The dimensional formula for energy is given as
Now let the magnitude of U in the original system of units be n, and in the new system of unit be n’
Then
Where [M1L12 T1-2] and [M2L22 T2-2] are the dimensions in the original system of units and new system of units respectively.
Now in the original system of units M1 = 1 kg , L1 = 1 m and T1 = 1 s. In the new system of units we have M2 = α kg , L2 = β m and T2 = γ s.
Thus, 5 J of energy will measure in the new system of units.
The volume of a liquid flowing out per second of a pipe of length l and radius r is written by a student as
where P is the pressure difference between the two ends of the pipe and η is coefficient of viscosity of the liquid having dimensional formula ML-1 T-1. Check whether the equation is dimensionally correct.
Given:
The equation for volume flow per second V=
The for the equation to be dimensionally correct the the dimensional formula of the equation must be equal to the dimensional formula of the volume flow per second.
Thus dimensional formula of
Dimensional formula of pressure
Dimensional formula of coefficient of viscosity
Dimensional formula of length
Dimensional formula of radius
Thus dimensional formula of RHS of the equation
And dimensional formula of LHS
Therefore, LHS = RHS
Thus, the given equation is dimensionally correct.
A physical quantity X is related to four measurable quantities a, b, c and d as follows:
X = a2 B3 c5/2 d-2
The percentage error in the measurement of a, b, c and d are 1%, 2%, 3% and 4%, respectively. What is the percentage error in quantity X ? If the value of X calculated on the basis of the above relation is 2.763, to what value should you round off the result.
Given:
The equation of X = a2 B3 c5/2 d-2
Percentage error in measurement of a = 1%
Percentage error in measurement of b = 2%
Percentage error in measurement of c = 3%
Percentage error in measurement of d = 4%
Calculated value of X = 2.763
The percentage error in X is given as , where ∆X is the error in X.
Similarly,
The percentage error in a =
The percentage error in b =
The percentage error in c =
The percentage error in d =
Therefore, from the given equation of X , the maximum percentage error in X can be calculated as follows
Therefore, the percentage error in measurement of X is 23.5%.
The absolute error in X is then = ±0.235 = ±0.24 after rounding off to two significant digits. Then, the value of X should be rounded off to two significant digits i.e. to 2.8.
In the expression P = E l2 m-5 G-2, E, m, l and G denote energy, mass, angular momentum and gravitational constant, respectively. Show that P is a dimensionless quantity.
Given:
Equation of P = E l2 m-5 G-2
The dimensional equation of energy E is [M2L1T-2], for mass m is [M1L0T0], for length l is [M0L1T0] and for gravitational constant G is [M-1L3T-2].
Now to prove that P is a dimensionless quantity we have to find, the dimensional formula for P. For this, we substitute the dimensional formulae of the above quantities in the expression for P
Hence, P is a dimensionless quantity.
If velocity of light c, Planck’s constant h and gravitational constant G are taken as fundamental quantities then express mass, length and time in terms of dimensions of these quantities.
The dimensional formula for velocity of light c is [M0L1T-1], for plank’s constant h is [ML2T-1] and for gravitational constant G is [M-1L3T-2].
1. Let the dimensional formula for mass m = cahbGc, then substituting the dimensional formula for c, h and G we have
Equating the exponents of like quantities on both sides we have
Adding the three equations and solving for b we have
Using this value of b and substituting in the above equations, we have
Now, substituting these equations in the expression for mass m we have
2. Let the dimensional formula for length l = cahbGc, then substituting the dimensional formula for c, h and G we have
Equating the exponents of like quantities on both sides, we have
Adding the three equations and solving for b we have
Using this value of b and substituting in the above equations, we have
Now, substituting these equations in the expression for length l we have
3. Let the dimensional formula for time t = cahbGc, then substituting the dimensional formula for c, h and G we have
Equating the exponents of like quantities on both sides, we have
Adding the three equations and solving for b we have
Using this value of b and substituting in the above equations, we have
Now, substituting these equations in the expression for length l we have
An artificial satellite is revolving around a planet of mass M and radius R, in a circular orbit of radius r. From Kepler’s Third law about the period of a satellite around a common central body, square of the period of revolution T is proportional to the cube of the radius of the orbit r. Show using dimensional analysis, that
T =
where k is a dimensionless constant and g is acceleration due to gravity.
According to Kepler’s Third law, the square of the time period of a satellite revolving around a planet, is proportional to the cube of the radius of the orbit of the satellite. Let T be the time period of revolution and r is the radius of the orbit, then
Since, the revolution of the satellite follows the laws of gravitation the time period of revolution depends on acceleration due to gravity g and the radius of the planet R,
Where k, is a dimensionless constant of proportionality.
Now the dimensional formula for time period [T] = [M0L0T1], for radius of planet [R] = [M0L1T0], for radius of orbit of satellite [r] = [M0L1T0] and for acceleration due to gravity [g] = [M0L1T-2]. Therefore,
Equating the exponents of like terms on both sides, we have
Substituting these values in the expression for T we obtain,
In an experiment to estimate the size of a molecule of oleic acid 1 mL of oleic acid is dissolved in 19 mL of alcohol. Then 1 mL of this solution is diluted to 20 mL by adding alcohol. Now 1 drop of this diluted solution is placed on water in a shallow trough. The solution spreads over the surface of water forming one molecule thick layer. Now, lycopodium powder is sprinkled evenly over the film and its diameter is measured. Knowing the volume of the drop and area of the film we can calculate the thickness of the film which will give us the size of oleic acid molecule.
Read the passage carefully and answer the following questions:
(a) Why do we dissolve oleic acid in alcohol?
(b) What is the role of lycopodium powder?
(c) What would be the volume of oleic acid in each mL of solution prepared?
(d) How will you calculate the volume of n drops of this solution of oleic acid?
(e) What will be the volume of oleic acid in one drop of this solution?
(a) Oleic acid is hydrophobic (water-hating) in nature and thus it cannot be dissolved in water. Therefore, to reduce its concentration it is dissolved in alcohol in which it is highly soluble. This alcohol is then dissolved in water to form a thin layer of oleic acid, and since it is hydrophobic the oleic acid molecules get organized next to each other in a single layer which is one molecule thick.
(b) Lycopodium powder is used to distinguish the region of oleic acid and water by forming a boundary between the two. It also weakens the surface tension of the oleic acid and allows the layer to expand to its maximum size.
(c) Given:
Volume of oleic acid in given solution = 1 ml
Volume of alcohol in given solution = 19 ml
Volume of additional alcohol added in the solution = 20 ml
We know that, 1 ml of oleic acid is present in 20 ml of the solution. Therefore, in 1ml of solution,
Therefore, in every 1 ml of solution there would be 0.05 ml of oleic acid. Now since this 1 ml solution is diluted by adding further 20 ml of alcohol, the final solution,
(d) For determining the volume of n drops of this solution an instrument called burette will be used. The burette will be filled to a desired volume as marked on the burette scale. The burette allows the solution to be released drop by drops and thus n drops will be counted, the final value of the volume will be measure through burette scale and then subtracted from the initial value which will be the volume of the no of drops.
Volume of n drops = Initial value – Final value
(e) Let there be n drops in 1 ml of this solution which will be measured by using the burette. We know that in 1 ml of this solution there is 0.0025 ml of oleic acid, then,
(a) How many astronomical units (A.U.) make 1 parsec?
(b) Consider a sunlike star at a distance of 2 parsecs. When it is seen through a telescope with 100 magnification, what should be the angular size of the star? Sun appears to be (1/2)° fromthe earth. Due to atmospheric fluctuations, eye can’t resolve objects smaller than 1 arc minute.
(c) Mars has approximately half of the earth’s diameter. When it is closest to the earth it is at about 1/2 A.U. from the earth. Calculate what size it will appear when seen through the same telescope.
(Comment : This is to illustrate why a telescope can magnify planets but not stars.)
(a) Parsec is defined as the distance at which 1 A.U. long arc subtends an angle of 1s. The angle subtended by an arc of length L and radius r is given as:
Here L = 1 A.U., θ = 1s and r = 1 parsec. Therefore
(b) Given:
Sun’s diameter as seen from earth =
Star’s distance from earth = 2 parsecs
Magnification of the telescope = 100
Minimum resolution eye due to atmosphere = 1’
The size of the star as seen from the earth can be considered by placing the sun at the same distance from earth as the star since it is sun like. Thus if sun appears to be in diameter from earth at 1 A.U. then for 2 parsecs or as calculated in (a) from 2 x 2.06 x 105 A.U. its angular diameter will be,
When seen from the telescope, the star will be 100 times magnified and therefore,
Converting to arc minutes the angular diameter will be 7.25 x 10-5 arc minutes. Since due to atmospheric fluctuations, the eye cannot resolve below 1 arc minute, the sun like star appears to be 1 arc minute in angular diameter.
(c) Given:
Ratio between mar’s diameter and earth’s diameter =
Let De, Dma and Ds be the diameters of earth, mars and the sun. Then we have,
Also, we know that
Therefore, we have,
To find the size of mars as seen from earth, we first place mars at distance equal to the earth-sun distance form earth i.e. 1 A.U. At 1 A.U. the sun appears to be in diameter, therefore for mars,
So, at mars’ original distance of A.U. mars will have a diameter of
With the telescope used in the previous problem,
Therefore, after magnification mars appears to be 30 arc minutes which is more than 1 arc minute and hence is not influenced by atmospheric fluctuations and is magnified. Thus, the distance of stars are so large in comparison to planets that stars cannot be magnified on earth while planets can be. To study stars, the stars are made brighter by allowing more light to enter the telescopes by using different designs.
Einstein’s mass - energy relation emerging out of his famous theory of relativity relates mass (m ) to energy (E ) as E = mc2, where c is speed of light in vacuum. At the nuclear level, the magnitudes of energy are very small. The energy at nuclear level is usually measured in MeV, where 1 MeV= 1.6×10-13J; the masses are measured in unified atomic mass unit (u) where
1u = 1.67 × 10-27 kg.
(a) Show that the energy equivalent of 1 u is 931.5 MeV.
(b) A student writes the relation as 1 u = 931.5 MeV. The teacher points out that the relation is dimensionally incorrect. Write the correct relation.
(a) By using Einstein’s mass energy relationship we have,
For one atomic mass unit m = 1 u = 1.67 x 10-27 kg.
Therefore, the energy equivalent,
Or
(b) Given:
Incorrect relation 1 u = 931.5 MeV
Frome Einstein’s equation we have,
For, m = 1 u , E = 931.5 MeV
Therefore, the dimensionally correct relation would be