If the differential equation of the fami...

If the differential equation of the family of curve given by `y=Ax+Be^(2x),` where A and B are arbitary constants is of the form
`(1-2x)(d)/(dx)((dy)/(dx)+ly)+k((dy)/(dx)+ly)=0,` then the ordered pair (k,l) is

A

(2,-2)

B

(-2,2)

C

(2,2)

D

(-2,-2)

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The correct Answer is:

A

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If the differential equation of the family of curve given by `y=Ax+Be^(2x),` where A and B are arbitary constants is of the form `(1-2x)(d)/(dx)((dy)/(dx)+ly)+k((dy)/(dx)+ly)=0,` then the ordered pair (k,l) is

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If the differential equation of the family of curve given by `y=Ax+Be^(2x),` where A and B are arbitary constants is of the form
`(1-2x)(d)/(dx)((dy)/(dx)+ly)+k((dy)/(dx)+ly)=0,` then the ordered pair (k,l) is