X = 3YZ2 find dimension of Y in (MKSA) system, if X and Z are the dimension of capacity and magnetic field respectively
(1)
(2) ML–2
(3)
(4)
In the relation , P is pressure, Z is the distance, k is the Boltzmann constant and θ is the temperature. The dimensional formula of β will be:
(1)
(2)
(3)
(4)
The frequency of vibration of string is given by . Here p is number of segments in the string and l is the length. The dimensional formula for m will be
(1)
(2)
(3)
(4)
Column I | Column II |
(i) Curie | (A) MLT–2 |
(ii) Light year | (B) M |
(iii) Dielectric strength | (C) Dimensionless |
(iv) Atomic weight | (D) T |
(v) Decibel | (E) ML2T–2 |
(F) MT–3 | |
(G) T–1 | |
(H) L | |
(I) MLT–3I–1 | |
(J) LT–1 |
Choose the correct match
(1) (i) G, (ii) H, (iii) I, (iv) B, (v) C
(2) (i) D, (ii) H, (iii) I, (iv) B, (v) G
(3) (i) G, (ii) H, (iii) I, (iv) B, (v) G
(4) None of the above
A wire has a mass of \((0.3\pm0.003)\) grams, a radius of \((0.5\pm 0.005)\) mm, and a length of \((0.6\pm0.006)\) cm. The maximum percentage error in the measurement of its density will be:
1. \(1\)
2. \(2\)
3. \(3\)
4. \(4\)
If \(97.52\) is divided by \(2.54\), the correct result in terms of significant figures is:
1. | \( 38.4 \) | 2. | \(38.3937 \) |
3. | \( 38.394 \) | 4. | \(38.39\) |
Assertion : ‘Light year’ and ‘Wavelength’ both measure distance.
Reason : Both have dimensions of time.
Assertion : Light year and year, both measure time.
Reason : Because light year is the time that light takes to reach the earth from the sun.
Assertion : Force cannot be added to pressure.
Reason : Because their dimensions are different.
Assertion : Linear mass density has the dimensions of .
Reason : Because density is always mass per unit volume.