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हल कीजिए- `(dy)/(dx)=(3e^(2x)+3e^(4x))/(e^(x) +e^(-x)). `

Answer» यहाँ `(dy)/(dx) =(3e^(2x)+3e^(4x))/(e^(x)+e^(-x))`
`implies(dy)/(dx) =(3e^(2x) (1+ e^(2x)))/(e^(x)+(1)/(e^(x)))`
`implies(dy)/(dx) =(3e^(2x)(1+e^(2x)))/(((1+e^(2x)))/(e^(x)))`
`implies(dy)/(dx) =(3e^(3x)(1+^(2x)))/((1+e^(2x)))`
`implies(dy)/(dx) =3e^(3x)`
`impliesdy =3e^(3x)dx,`
समाकलन करने पर,
`int dy =int 3e^(3x)dx`
` impliesy=(3e^(3x))/(3)+C`
`impliesy=e^(3x)+C` a


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