ABC ত্রিভুজে cosA + cosC = sinB হলে angleA সমান-

Another Explanation (5): ABC ত্রিভুজে, \( \angle{A} + \angle{B} + \angle{C} = 180^\circ \) 🥳 দেওয়া আছে, \( \cos{A} + \cos{C} = \sin{B} \) যেহেতু \( \angle{B} = 180^\circ - (\angle{A} + \angle{C}) \), তাই \( \sin{B} = \sin{(180^\circ - (A+C))} = \sin{(A+C)} \) 😎 সুতরাং, \( \cos{A} + \cos{C} = \sin{(A+C)} \) \( \cos{A} + \cos{C} = \sin{A}\cos{C} + \cos{A}\sin{C} \) 🤓 \( \cos{A} - \cos{A}\sin{C} = \sin{A}\cos{C} - \cos{C} \) \( \cos{A}(1 - \sin{C}) = \cos{C}(\sin{A} - 1) \) 😥 \( \cos{A}(1 - \sin{C}) = -\cos{C}(1 - \sin{A}) \) এখন, \( \cos{A} + \cos{C} = \sin{B} \) উভয় পক্ষে \( 2\cos(\frac{A+C}{2})\cos(\frac{A-C}{2}) = 2\sin(\frac{B}{2})\cos(\frac{B}{2}) \) 🤔 \( \cos(\frac{A+C}{2})\cos(\frac{A-C}{2}) = \sin(\frac{B}{2})\cos(\frac{B}{2}) \) আমরা জানি, \( A+B+C = 180^\circ \) ⇒ \( A+C = 180^\circ - B \) ⇒ \( \frac{A+C}{2} = 90^\circ - \frac{B}{2} \) সুতরাং, \( \cos(90^\circ - \frac{B}{2})\cos(\frac{A-C}{2}) = \sin(\frac{B}{2})\cos(\frac{B}{2}) \) ⇒ \( \sin(\frac{B}{2})\cos(\frac{A-C}{2}) = \sin(\frac{B}{2})\cos(\frac{B}{2}) \) যেহেতু \( \sin(\frac{B}{2}) \neq 0 \), তাই \( \cos(\frac{A-C}{2}) = \cos(\frac{B}{2}) \) 🤩 \( \frac{A-C}{2} = \frac{B}{2} \) অথবা \( \frac{A-C}{2} = -\frac{B}{2} \) যদি \( \frac{A-C}{2} = \frac{B}{2} \) হয়, তবে \( A - C = B \) ⇒ \( A = B + C \) আমরা জানি, \( A + B + C = 180^\circ \) ⇒ \( (B+C) + B + C = 180^\circ \) ⇒ \( 2(B+C) = 180^\circ \) ⇒ \( B+C = 90^\circ \) সুতরাং, \( A = 90^\circ \) 🥰 যদি \( \frac{A-C}{2} = -\frac{B}{2} \) হয়, তবে \( A - C = -B \) ⇒ \( A + B = C \) আমরা জানি, \( A + B + C = 180^\circ \) ⇒ \( C + C = 180^\circ \) ⇒ \( 2C = 180^\circ \) ⇒ \( C = 90^\circ \) এই ক্ষেত্রে, \( A+B = 90^\circ \) এবং \( \cos{A} + \cos{90^\circ} = \sin{B} \) \( \cos{A} = \sin{B} \) ⇒ \( \cos{A} = \sin{(90^\circ - A)} \) ⇒ \( \cos{A} = \cos{A} \) , যা সঠিক। কিন্তু আমাদের \( \angle A \) এর মান বের করতে হবে। যেহেতু \( \angle A + \angle B = 90^\circ \), তাই \( B = 90^\circ - A \) সুতরাং, \( \sin B = \sin(90^\circ - A) = \cos A \). অতএব, \( \angle{A} = 90^\circ \) 🥳