Input:
dsolve(ds(y,x,sin(x))-y-exp(x)=0)
Write:
`dsolve(ds(y,x,sin(x))-y-exp(x)=0)`
Compute:
$$dsolve(\frac{d^{{sin(x)}}y}{dx^{{sin(x)}}}-exp(x)-y=0)$$
Output:
$$dsolve(\frac{d^{{sin(x)}}y}{dx^{{sin(x)}}}-exp(x)-y=0)== C_1\ E_{sin(x)} ({x}^{sin(x)})+\frac {exp(x)}{sin(x)}\ x$$ Result: $$C_1\ E_{sin(x)} ({x}^{sin(x)})+\frac {exp(x)}{sin(x)}\ x$$
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