Is change in enthalpy defined only at constant pressure?
I know that $Q-W=\Delta U $, and $Q$ at constant pressure equals $\Delta H$ (enthalpy change).
Can $Q$ (heat given to the system) be used interchangeably with $\Delta H$ in the first equation?
Is $ \Delta H =nC_p\Delta T$? How?
Is change in enthalpy defined only at constant pressure?
No. The definition of $\Delta H$ is $\Delta H = \Delta U + \Delta (PV)$ Simple as that.
I know Q-W=del(U) And Q at constant pressure equals del(H) (enthalpy change).
Can Q (heat given to the system) be used interchangeably with del(H) in the first equation?
No. Only if the applied pressure is held constant during the change.
Is del(H) =nCp del(T)? How?
No. Only for an ideal gas. For real gases, this equation is not correct outside the limit of ideal gas behavior. For an ideal gas, $\Delta U=nCv\Delta T$ and $\Delta (PV)=nR\Delta T$, so $\Delta H=n(C_V+R)\Delta T$. And then $C_p=(\partial H/\partial T)_P=C_v+R$, so $\Delta H=nC_P\Delta T$.
For a real gas, liquid, or solid, $$dH=nC_PdT+\left[V-T\left(\frac{\partial V}{dT}\right)_P\right]dP$$ Note that the term in brackets is zero for an ideal gas.
Is change in enthalpy defined only at constant pressure?
No, enthalpy-change is not meant only for isobar processes.
Can Q (heat given to the system) be used interchangeably with del(H) in the first equation?
No, not always. Only when the non-compression work done by the system is zero, then only $\delta Q$ be interchanged with $\mathrm dH\;.$ See my answer to this ChemSE post.
Is del(H) =nCp del(T)?
Yes, indeed.
How?
Check my answer to this ChemSE post.
