AP EAMCET · Maths · Definite Integration
If \(\int_0^{2024 \pi} \frac{2023^{\sin ^2 x}}{2023^{\sin ^2 x}+2023^{\cos ^2 x}} d x=k\), then \(\left(\frac{2 k}{\pi}+1\right)=\)
- A 2023
- B 2025
- C 2022
- D 2024
Answer & Solution
Correct Answer
(B) 2025
Step-by-step Solution
Detailed explanation
Given : \(\int_0^{2024 \pi} \frac{2023^{\sin ^2 x}}{2023^{\sin ^2 x}+2023^{\cos ^2 x}} d x=k\) ....(i) Let \(I=\int_0^{2024 \pi} \frac{2023^{\sin ^2 x}}{2023^{\sin ^2 x}+2023^{\cos ^2 x}} d x\) ...(ii)…
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