AP EAMCET · Maths · Differential Equations
The general solution of the differential equation \(\sec (x-y+1) d y=d x\) is
- A \(x+\cot \left(\frac{x-y+1}{2}\right)=c\)
- B \(x+\cot (x-y+1)=c\)
- C \(x-\cot \left(\frac{x-y+1}{2}\right)=c\)
- D \(x-\cot (x-y+1)=c\)
Answer & Solution
Correct Answer
(A) \(x+\cot \left(\frac{x-y+1}{2}\right)=c\)
Step-by-step Solution
Detailed explanation
Let \(v = x-y+1\). Then \(dv = dx - dy \implies dy = dx - dv\). The equation becomes: \(\sec(v) (dx - dv) = dx\) \(\sec(v) dx - \sec(v) dv = dx\) \((\sec(v) - 1) dx = \sec(v) dv\) \(dx = \frac{\sec(v)}{\sec(v) - 1} dv\) \(dx = \frac{1}{1 - \cos(v)} dv\)…
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