139518 If velocity \((\mathrm{V})\), acceleration \((\mathrm{A})\) and force \((\mathrm{F})\) are considered as fundamental units then the dimension of Young's modulus will be

139519 Dimensional formula of electric flux

139522 If the velocity of light \(C\), the gravitational constant \(\mathbf{G}\) and Planck's constant \(h\) are chosen as the fundamental units, the dimension of density in the new system is

139523 Given below are two statements: One is labelled as Assertion (A) and other is labelled as Reason (R).
Assertion (A) : Time period of oscillation of a liquid drop depends on surface tension (S), if density of the liquid is \(\rho\) and radius of the drop is \(r\), then \(T=K \sqrt{\rho r^{3} / S^{\frac{3}{2}}}\) is dimensionally correct, where \(K\) is dimensionless
Reason (R) : Using dimensional analysis we get R.H.S. having different dimension than that of time period.
In the light of above statements, choose the correct answer from the options given below.

139518 If velocity \((\mathrm{V})\), acceleration \((\mathrm{A})\) and force \((\mathrm{F})\) are considered as fundamental units then the dimension of Young's modulus will be

139519 Dimensional formula of electric flux

139522 If the velocity of light \(C\), the gravitational constant \(\mathbf{G}\) and Planck's constant \(h\) are chosen as the fundamental units, the dimension of density in the new system is

139523 Given below are two statements: One is labelled as Assertion (A) and other is labelled as Reason (R).
Assertion (A) : Time period of oscillation of a liquid drop depends on surface tension (S), if density of the liquid is \(\rho\) and radius of the drop is \(r\), then \(T=K \sqrt{\rho r^{3} / S^{\frac{3}{2}}}\) is dimensionally correct, where \(K\) is dimensionless
Reason (R) : Using dimensional analysis we get R.H.S. having different dimension than that of time period.
In the light of above statements, choose the correct answer from the options given below.

139518 If velocity \((\mathrm{V})\), acceleration \((\mathrm{A})\) and force \((\mathrm{F})\) are considered as fundamental units then the dimension of Young's modulus will be

139519 Dimensional formula of electric flux

139522 If the velocity of light \(C\), the gravitational constant \(\mathbf{G}\) and Planck's constant \(h\) are chosen as the fundamental units, the dimension of density in the new system is

139523 Given below are two statements: One is labelled as Assertion (A) and other is labelled as Reason (R).
Assertion (A) : Time period of oscillation of a liquid drop depends on surface tension (S), if density of the liquid is \(\rho\) and radius of the drop is \(r\), then \(T=K \sqrt{\rho r^{3} / S^{\frac{3}{2}}}\) is dimensionally correct, where \(K\) is dimensionless
Reason (R) : Using dimensional analysis we get R.H.S. having different dimension than that of time period.
In the light of above statements, choose the correct answer from the options given below.

139518 If velocity \((\mathrm{V})\), acceleration \((\mathrm{A})\) and force \((\mathrm{F})\) are considered as fundamental units then the dimension of Young's modulus will be

139519 Dimensional formula of electric flux

139522 If the velocity of light \(C\), the gravitational constant \(\mathbf{G}\) and Planck's constant \(h\) are chosen as the fundamental units, the dimension of density in the new system is

139523 Given below are two statements: One is labelled as Assertion (A) and other is labelled as Reason (R).
Assertion (A) : Time period of oscillation of a liquid drop depends on surface tension (S), if density of the liquid is \(\rho\) and radius of the drop is \(r\), then \(T=K \sqrt{\rho r^{3} / S^{\frac{3}{2}}}\) is dimensionally correct, where \(K\) is dimensionless
Reason (R) : Using dimensional analysis we get R.H.S. having different dimension than that of time period.
In the light of above statements, choose the correct answer from the options given below.