Advertisements
Advertisements
प्रश्न
The dimension ML−1T−2 can correspond to
विकल्प
moment of a force
surface tension
modulus of elasticity
coefficient of viscosity
MCQ
Advertisements
उत्तर
Dimension of modulus of elasticity:
\[\frac{\frac{F}{A}}{\frac{∆ l}{l}} = \frac{\left[ ML T^{- 2} \right]}{L^2} = \left[ M L^{- 1} T^{- 2} \right]\]
Dimension of moment of force:
\[FL = \left[ ML T^{- 2} \right][L] = \left[ M L^2 T^{- 2} \right]\]
Dimension of surface tension:
\[\frac{F}{L} = \frac{\left[ ML T^{- 2} \right]}{L} = \left[ M T^{- 2} \right]\]
Dimension of coefficient of viscosity:
\[\frac{FL}{Av} = \frac{\left[ ML T^{- 2} \right]\left[ L \right]}{\left[ L^2 \right]\left[ L T^{- 1} \right]} = \left[ M L^{- 1} T^{- 1} \right]\]
shaalaa.com
क्या इस प्रश्न या उत्तर में कोई त्रुटि है?
