367280 The velocity of a particle depends upon \({t}\) as \({v=A+B t+C t^{2}}\). If velocity is in \({{m} / {s}}\), the unit of \({A}\) will be

367281 Force \(F\) and density \(d\) are related as \(F=\dfrac{\alpha}{\beta+\sqrt{d}}\) then find the dimensions of \(\alpha\) :

367282 Find the dimensions of \(\frac{a}{b}\) in the equation \(P = \frac{{a - {t^2}}}{{bx}}\) where \(P\) is pressure, \(x\) is distance and \(t\) is time.

367283 Assertion :
The equation \(y=x+t\) cannot be true, where \(x, y\) are distance and \(t\) is time.
Reason :
Quantities with different dimensions cannot be added.

367284 Let Force \(F = A\sin (Ct) + B\cos (Dx)\), where \(x\) and \(t\) are displacment and time respectively,. The dimension of \(\frac{C}{D}\) are same as dimension of

367280 The velocity of a particle depends upon \({t}\) as \({v=A+B t+C t^{2}}\). If velocity is in \({{m} / {s}}\), the unit of \({A}\) will be

367281 Force \(F\) and density \(d\) are related as \(F=\dfrac{\alpha}{\beta+\sqrt{d}}\) then find the dimensions of \(\alpha\) :

367282 Find the dimensions of \(\frac{a}{b}\) in the equation \(P = \frac{{a - {t^2}}}{{bx}}\) where \(P\) is pressure, \(x\) is distance and \(t\) is time.

367283 Assertion :
The equation \(y=x+t\) cannot be true, where \(x, y\) are distance and \(t\) is time.
Reason :
Quantities with different dimensions cannot be added.

367284 Let Force \(F = A\sin (Ct) + B\cos (Dx)\), where \(x\) and \(t\) are displacment and time respectively,. The dimension of \(\frac{C}{D}\) are same as dimension of

367280 The velocity of a particle depends upon \({t}\) as \({v=A+B t+C t^{2}}\). If velocity is in \({{m} / {s}}\), the unit of \({A}\) will be

367281 Force \(F\) and density \(d\) are related as \(F=\dfrac{\alpha}{\beta+\sqrt{d}}\) then find the dimensions of \(\alpha\) :

367282 Find the dimensions of \(\frac{a}{b}\) in the equation \(P = \frac{{a - {t^2}}}{{bx}}\) where \(P\) is pressure, \(x\) is distance and \(t\) is time.

367283 Assertion :
The equation \(y=x+t\) cannot be true, where \(x, y\) are distance and \(t\) is time.
Reason :
Quantities with different dimensions cannot be added.

367284 Let Force \(F = A\sin (Ct) + B\cos (Dx)\), where \(x\) and \(t\) are displacment and time respectively,. The dimension of \(\frac{C}{D}\) are same as dimension of

367280 The velocity of a particle depends upon \({t}\) as \({v=A+B t+C t^{2}}\). If velocity is in \({{m} / {s}}\), the unit of \({A}\) will be

367281 Force \(F\) and density \(d\) are related as \(F=\dfrac{\alpha}{\beta+\sqrt{d}}\) then find the dimensions of \(\alpha\) :

367282 Find the dimensions of \(\frac{a}{b}\) in the equation \(P = \frac{{a - {t^2}}}{{bx}}\) where \(P\) is pressure, \(x\) is distance and \(t\) is time.

367283 Assertion :
The equation \(y=x+t\) cannot be true, where \(x, y\) are distance and \(t\) is time.
Reason :
Quantities with different dimensions cannot be added.

367284 Let Force \(F = A\sin (Ct) + B\cos (Dx)\), where \(x\) and \(t\) are displacment and time respectively,. The dimension of \(\frac{C}{D}\) are same as dimension of

367280 The velocity of a particle depends upon \({t}\) as \({v=A+B t+C t^{2}}\). If velocity is in \({{m} / {s}}\), the unit of \({A}\) will be

367281 Force \(F\) and density \(d\) are related as \(F=\dfrac{\alpha}{\beta+\sqrt{d}}\) then find the dimensions of \(\alpha\) :

367282 Find the dimensions of \(\frac{a}{b}\) in the equation \(P = \frac{{a - {t^2}}}{{bx}}\) where \(P\) is pressure, \(x\) is distance and \(t\) is time.

367283 Assertion :
The equation \(y=x+t\) cannot be true, where \(x, y\) are distance and \(t\) is time.
Reason :
Quantities with different dimensions cannot be added.

367284 Let Force \(F = A\sin (Ct) + B\cos (Dx)\), where \(x\) and \(t\) are displacment and time respectively,. The dimension of \(\frac{C}{D}\) are same as dimension of