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(a) 1 cm =

Volume of the cube = 1 cm³

But, 1 cm³ = 1 cm × 1 cm × 1 cm =

∴1 cm³ = 10^–6 m³

Hence, the volume of a cube of side 1 cm is equal to 10^–6 m³.

(b) The total surface area of a cylinder of radius r and height h is

S = 2πr (r + h).

Given that,

r = 2 cm = 2 × 1 cm = 2 × 10 mm = 20 mm

h = 10 cm = 10 × 10 mm = 100 mm

= 15072 = 1.5 × 10⁴ mm²

(c) Using the conversion,

1 km/h =

Therefore, distance can be obtained using the relation:

Distance = Speed × Time = 5 × 1 = 5 m

Hence, the vehicle covers 5 m in 1 s.

(d) Relative density of a substance is given by the relation,

Relative density =

Density of water = 1 g/cm³

Again, 1g =

1 cm³ = 10^–6 m³

1 g/cm³ =

∴ 11.3 g/cm³ = 11.3 × 10³ kg/m³

(a) 1 kg = 10³ g

1 m² = 10⁴ cm²

1 kg m² s^–2 = 1 kg × 1 m² × 1 s^–2

=10³ g × 10⁴ cm² × 1 s^–2 = 10⁷ g cm² s^–2

(b) Light year is the total distance travelled by light in one year.

1 ly = Speed of light × One year

= (3 × 10⁸ m/s) × (365 × 24 × 60 × 60 s)

= 9.46 × 10¹⁵ m

(c) 1 m = 10^–3 km

Again, 1 s =

1 s^–1 = 3600 h^–1

1 s^–2 = (3600)² h^–2

∴3 m s^–2 = (3 × 10^–3 km) × ((3600)² h^–2)= 3.88 × 10⁴ km h^–2

(d) 1 N = 1 kg m s^–2

1 kg = 10^–3 g^–1

1 m³ = 10⁶ cm³

∴ 6.67 × 10^–11 N m² kg^–2 = 6.67 × 10^–11 × (1 kg m s^–2) (1 m²) (1 s^–2)

= 6.67 × 10^–11 × (1 kg × 1 m³ × 1 s^–2)

= 6.67 × 10^–11 × (10^–3 g^–1) × (10⁶ cm³) × (1 s^–2)

= 6.67 × 10^–8 cm³ s^–2 g^–1

Given that,

1 calorie = 4.2 (1 kg) (1 m²) (1 s^–2)

New unit of mass = α kg

Hence, in terms of the new unit, 1 kg =

In terms of the new unit of length,

And, in terms of the new unit of time,

∴1 calorie = 4.2 (1 α^–1) (1 β^–2) (1 γ²) = 4.2 α^–1 β^–2 γ²

The given statement is true because a dimensionless quantity may be large or small in comparision to some standard reference. For example, the coefficient of friction is dimensionless. The coefficient of sliding friction is greater than the coefficient of rolling friction, but less than static friction.

(a) An atom is a very small object in comparison to a soccer ball.

(b) A jet plane moves with a speed greater than that of a bicycle.

(c) Mass of Jupiter is very large as compared to the mass of a cricket ball.

(d) The air inside this room contains a large number of molecules as compared to that present in a geometry box.

(e) A proton is more massive than an electron.

(f) Speed of sound is less than the speed of light.

Distance between the Sun and the Earth:

= Speed of light × Time taken by light to cover the distance

Given that in the new unit, speed of light = 1 unit

Time taken, t = 8 min 20 s = 500 s

∴Distance between the Sun and the Earth = 1 × 500 = 500 units

A device with minimum count is the most suitable to measure length.

(a) Least count of vernier callipers

= 1 standard division (SD) – 1 vernier division (VD)

(b) Least count of screw gauge =

(c) Least count of an optical device = Wavelength of light ∼ 10^–5 cm

= 0.00001 cm

Hence, it can be inferred that an optical instrument is the most suitable device to measure length.

Magnification of the microscope = 100

Average width of the hair in the field of view of the microscope = 3.5 mm

∴Actual thickness of the hair is = 0.035 mm.

(a) Wrap the thread on a uniform smooth rod in such a way that the coils thus formed are very close to each other. Measure the length of the thread using a metre scale. The diameter of the thread is given by the relation,

(b) It is not possible to increase the accuracy of a screw gauge by increasing the number of divisions of the circular scale. Increasing the number divisions of the circular scale will increase its accuracy to a certain extent only.

(c) A set of 100 measurements is more reliable than a set of 5 measurements because random errors involved in the former are very less as compared to the latter.

Area of the house on the slide = 1.75 cm²

Area of the image of the house formed on the screen = 1.55 m²

= 1.55 × 10⁴ cm²

Arial magnification, m_a =

∴Linear magnifications, m_l =

(a) Answer: 1

The given quantity is 0.007 m².

If the number is less than one, then all zeros on the right of the decimal point (but left to the first non-zero) are insignificant. This means that here, two zeros after the decimal are not significant. Hence, only 7 is a significant figure in this quantity.

(b) Answer: 3

The given quantity is 2.64 × 10²⁴ kg.

Here, the power of 10 is irrelevant for the determination of significant figures. Hence, all digits i.e., 2, 6 and 4 are significant figures.

(c) Answer: 4

The given quantity is 0.2370 g cm^–3.

For a number with decimals, the trailing zeroes are significant. Hence, besides digits 2, 3 and 7, 0 that appears after the decimal point is also a significant figure.

(d) Answer: 4

The given quantity is 6.320 J.

For a number with decimals, the trailing zeroes are significant. Hence, all four digits appearing in the given quantity are significant figures.

(e) Answer: 4

The given quantity is 6.032 Nm^–2.

All zeroes between two non-zero digits are always significant.

(f) Answer: 4

The given quantity is 0.0006032 m².

If the number is less than one, then the zeroes on the right of the decimal point (but left to the first non-zero) are insignificant. Hence, all three zeroes appearing before 6 are not significant figures. All zeros between two non-zero digits are always significant. Hence, the remaining four digits are significant figures.

Length of sheet, l = 4.234 m

Breadth of sheet, b = 1.005 m

Thickness of sheet, h = 2.01 cm = 0.0201 m

The given table lists the respective significant figures:

Hence, area and volume both must have least significant figures i.e., 3.

Surface area of the sheet = 2 (l × b + b × h + h × l)

= 2(4.234 × 1.005 + 1.005 × 0.0201 + 0.0201 × 4.234)
= 2(4.25517 + 0.0202005 + 0.0851034)
= 2 × 4.36
= 8.72 m²

Volume of the sheet = l × b × h

= 4.234 × 1.005 × 0.0201

= 0.0855 m³

This number has only 3 significant figures i.e., 8, 5, and 5.

Mass of grocer’s box = 2.300 kg

Mass of gold piece I = 20.15g = 0.02015 kg

Mass of gold piece II = 20.17 g = 0.02017 kg

(a) Total mass of the box = 2.3 + 0.02015 + 0.02017 = 2.34032 kg

In addition, the final result should retain as many decimal places as there are in the number with the least decimal places. Hence, the total mass of the box is 2.3 kg.

(b) Difference in masses = 20.17 – 20.15 = 0.02 g

In subtraction, the final result should retain as many decimal places as there are in the number with the least decimal places.

Percentage error in P = 13 %

Value of P is given as 3.763.

By rounding off the given value to the first decimal place, we get P = 3.8.

(a) Answer: Correct

Dimension of y = M⁰ L¹ T⁰

Dimension of a = M⁰ L¹ T⁰

Dimension of = M⁰ L⁰ T⁰

Dimension of L.H.S = Dimension of R.H.S

Hence, the given formula is dimensionally correct.

(b) Answer: Incorrect

y = a sin vt

Dimension of y = M⁰ L¹ T⁰

Dimension of a = M⁰ L¹ T⁰

Dimension of vt = M⁰ L¹ T^–1 × M⁰ L⁰ T¹ = M⁰ L¹ T⁰

But the argument of the trigonometric function must be dimensionless, which is not so in the given case. Hence, the given formula is dimensionally incorrect.

(c) Answer: Incorrect

Dimension of y = M⁰L¹T⁰

Dimension of = M⁰L¹T^–1

Dimension of= M⁰ L^–1 T¹

But the argument of the trigonometric function must be dimensionless, which is not so in the given case. Hence, the formula is dimensionally incorrect.

(d) Answer: Correct

Dimension of y = M⁰ L¹ T⁰

Dimension of a = M⁰ L¹ T⁰

Dimension of = M⁰ L⁰ T⁰

Since the argument of the trigonometric function must be dimensionless (which is true in the given case), the dimensions of y and a are the same. Hence, the given formula is dimensionally correct.

Given the relation,

Dimension of m = M¹ L⁰ T⁰

Dimension of = M¹ L⁰ T⁰

Dimension of v = M⁰ L¹ T^–1

Dimension of v² = M⁰ L² T^–2

Dimension of c = M⁰ L¹ T^–1

The given formula will be dimensionally correct only when the dimension of L.H.S is the same as that of R.H.S. This is only possible when the factor, is dimensionless i.e., (1 – v²) is dimensionless. This is only possible if v² is divided by c². Hence, the correct relation is

Radius of hydrogen atom, r = 0.5 = 0.5 × 10^–10 m

Volume of hydrogen atom =

1 mole of hydrogen contains 6.023 × 10²³ hydrogen atoms.

∴ Volume of 1 mole of hydrogen atoms = 6.023 × 10²³ × 0.524 × 10^–30

= 3.16 × 10^–7 m³

Radius of hydrogen atom, r = 0.5 = 0.5 × 10^–10 m

Volume of hydrogen atom =

Now, 1 mole of hydrogen contains 6.023 × 10²³ hydrogen atoms.

∴ Volume of 1 mole of hydrogen atoms, V_a = 6.023 × 10²³ × 0.524 × 10^–30

= 3.16 × 10^–7 m³

Molar volume of 1 mole of hydrogen atoms at STP,

V_m = 22.4 L = 22.4 × 10^–3 m³

Hence, the molar volume is 7.08 × 10⁴ times higher than the atomic volume. For this reason, the inter-atomic separation in hydrogen gas is much larger than the size of a hydrogen atom.

Line of sight is defined as an imaginary line joining an object and an observer’s eye. When we observe nearby stationary objects such as trees, houses, etc. while sitting in a moving train, they appear to move rapidly in the opposite direction because the line of sight changes very rapidly.

On the other hand, distant objects such as trees, stars, etc. appear stationary because of the large distance. As a result, the line of sight does not change its direction rapidly.

Diameter of Earth’s orbit = 3 × 10¹¹ m

Radius of Earth’s orbit, r = 1.5 × 10¹¹ m

Let the distance parallax angle be= 4.847 × 10^–6 rad.

Let the distance of the star be D.

Parsec is defined as the distance at which the average radius of the Earth’s orbit subtends an angle of.

∴ We have

Hence, 1 parsec ≈ 3.09 × 10¹⁶ m.

Distance of the star from the solar system = 4.29 ly

1 light year is the distance travelled by light in one year.

1 light year = Speed of light × 1 year

= 3 × 10⁸ × 365 × 24 × 60 × 60 = 94608 × 10¹¹ m

∴4.29 ly = 405868.32 × 10¹¹ m

1 parsec = 3.08 × 10¹⁶ m

∴4.29 ly = = 1.32 parsec

Using the relation,

But, 1 sec = 4.85 × 10^–6 rad

∴

It is indeed very true that precise measurements of physical quantities are essential for the development of science. For example, ultra-shot laser pulses (time interval ∼ 10^–15 s) are used to measure time intervals in several physical and chemical processes.

X-ray spectroscopy is used to determine the inter-atomic separation or inter-planer spacing.

The development of mass spectrometer makes it possible to measure the mass of atoms precisely.

(a) During monsoons, a metrologist records about 215 cm of rainfall in India i.e., the height of water column, h = 215 cm = 2.15 m

Area of country, A = 3.3 × 10¹² m²

Hence, volume of rain water, V = A × h = 7.09 × 10¹² m³

Density of water, ρ = 1 × 10³ kg m^–3

Hence, mass of rain water = ρ × V = 7.09 × 10¹⁵ kg

Hence, the total mass of rain-bearing clouds over India is approximately 7.09 × 10¹⁵ kg.

(b) Consider a ship of known base area floating in the sea. Measure its depth in sea (say d₁).

Volume of water displaced by the ship, V_b = A d₁

Now, move an elephant on the ship and measure the depth of the ship (d₂) in this case.

Volume of water displaced by the ship with the elephant on board, V_be= Ad₂

Volume of water displaced by the elephant = Ad₂ – Ad₁

Density of water = D

Mass of elephant = AD (d₂ – d₁)

(c) Wind speed during a storm can be measured by an anemometer. As wind blows, it rotates. The rotation made by the anemometer in one second gives the value of wind speed.

(d) Area of the head surface carrying hair = A

With the help of a screw gauge, the diameter and hence, the radius of a hair can be determined. Let it be r.

∴Area of one hair = πr²

Number of strands of hair

(e) Let the volume of the room be V.

One mole of air at NTP occupies 22.4 l i.e., 22.4 × 10^–3 m³ volume.

Number of molecules in one mole = 6.023 × 10²³

∴Number of molecules in room of volume V

== 134.915 × 10²⁶V

= 1.35 × 10²⁸V