A physical quantity \(P\) is given by \(P=\dfrac{A^3 B^{1/2}}{C^{-4}D^{3/2}}.\) The quantity which contributes the maximum percentage error in \(P\) is:
1. | \(A\) | 2. | \(B\) |
3. | \(C\) | 4. | \(D\) |
If L = 2.331 cm, B = 2.1 cm, then L + B =?
1. 4.431 cm
2. 4.43 cm
3. 4.4 cm
4. 4 cm
If the length of rod A is 3.25 ± 0.01 cm and that of B is 4.19 ± 0.01 cm then the rod B is longer than rod A by
1. 0.94 ± 0.00 cm
2. 0.94 ± 0.01 cm
3. 0.94 ± 0.02 cm
4. 0.94 ± 0.005 cm
A physical quantity is given by . The percentage error in measurement of M, L and T are and respectively. Then maximum percentage error in the quantity X is
1.
2.
3.
4. None of these
A physical quantity \(A\) is related to four observable quantities \(a\), \(b\), \(c\) and \(d\) as follows, \(A= \frac{a^2b^3}{c\sqrt{d}},\) the percentage errors of measurement in \(a\), \(b\), \(c\) and \(d\) are \(1\%\), \(3\%\), \(2\%\) and \(2\%\) respectively. The percentage error in quantity \(A\) will be:
1. \(12\%\)
2. \(7\%\)
3. \(5\%\)
4. \(14\%\)
If the acceleration due to gravity is 10 ms–2 and the units of length and time are changed in kilometer and hour respectively, the numerical value of the acceleration is
1. 360000
2. 72,000
3. 36,000
4. 129600
If L, C and R represent inductance, capacitance and resistance respectively, then which of the following does not represent dimensions of frequency? [This question includes concepts from the 12th syllabus]
1.
2.
3.
4.
The number of particles crossing a unit area perpendicular to the \(x\)-axis in unit time is given by \(n= -D\frac{n_2-n_1}{x_2-x_1}\)
1. \(\left[M^0LT^{2}\right]\)
2. \(\left[M^0L^2T^{-4}\right]\)
3. \(\left[M^0LT^{-3}\right]\)
4. \(\left[M^0L^2T^{-1}\right]\)
With the usual notations, the following equation is
1. Only numerically correct
2. Only dimensionally correct
3. Both numerically and dimensionally correct
4. Neither numerically nor dimensionally correct
If the dimensions of length are expressed as ; where G, c and h are the universal gravitational constant, speed of light and Planck's constant respectively, then
1.
2.
3.
4.