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Question
Solve the following:
If `("d"y)/("d"x) + 2 y tan x = sin x` and if y = 0 when x = `pi/3` express y in term of x
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Solution
`("d"y)/("d"x) + 2 y tan x = sin x`
It is of the form `("d"y)/("d"x) + "P"y` = Q
Here P = 2tan x
Q = sin x
`int "Pd"x = int 2 tan x "d"x`
= `2 int tan x "d"x`
= `2 log sec x`
= `log sec^2x`
I.F = `"e"^(int pdx)`
= `"e"^(log(sec^2x)`
= sec2x
The required solution is
y(I.F) = `int "Q"("I.F") "d"x + "c"`
y(sec2x) = `int sin x (sec^2x) "d"x + "c"`
y(sec2x) = `int sin x (1/(cos x)) sec x "d"x + "c"`
y(sec2x) = `int (sinx/cosx) sec x "d"x + "c"`
y(sec2x) = `int tan x sec x "d"x + "c"`
⇒ y(sec2x) = sec x + c ........(1)
If y = 0
When x = `pi/3`
Then (1)
⇒ `0(sec^2 (pi/3)) = sec (pi/3) + "c"`
0 = 2 + c
⇒ c = – 2
∴ Equation (1)
⇒ y sec2x = sec x – 2
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