第1个回答 2021-08-21
∫1/(sinx+cosx) dx
=∫1/[√2·(sinxcosπ/4+sinπ/4·cosx)]dx
=∫1/[√2·sin(x+π/4)] dx
=√2/2 ∫csc(x+π/4) d(x+π/4)
=√2/2 ln|csc(x+π/4)-cot(x+π/4)|+C
不定积分的公式:
1、∫ a dx = ax + C,a和C都是常数
2、∫ x^a dx = [x^(a + 1)]/(a + 1) + C,其中a为常数且 a ≠ -1
3、∫ 1/x dx = ln|x| + C
4、∫ a^x dx = (1/lna)a^x + C,其中a > 0 且 a ≠ 1
5、∫ e^x dx = e^x + C
6、∫ cosx dx = sinx + C
7、∫ sinx dx = - cosx + C
8、∫ cotx dx = ln|sinx| + C = - ln|cscx| + C
本回答被网友采纳第2个回答 2021-05-15
简单计算一下即可,答案如图所示
第3个回答 推荐于2018-03-18
令u = tan(x / 2),dx = 2du / (1+u²)
sinx = 2u / (1+u²),cosx = (1 - u²) / (1 + u²)
∫ dx / (sinx + cosx)
= ∫ 2 / 【(1 + u²) * [2u / (1+u²) + (1 - u²) / (1 + u²)]】 du
= 2∫ du / (-u² + 2u + 1)
= 2∫ du / [2 - (u - 1)²]
= 2∫ dy / (2 - y²),y=u - 1
= (1 / 2√2)ln|(y + √2) / (y - √2)| + C
= (1 / 2√2)ln|(u - 1 + √2) / (y - 1 - √2)| + C
= (1 / 2√2)ln|[tan(x / 2) - 1 + √2] / [tan(x / 2) - 1 - √2)| + C
= √2arctanh【[tan(x / 2) - 1] / √2】+ C本回答被提问者和网友采纳
sinx = 2u / (1+u²),cosx = (1 - u²) / (1 + u²)
∫ dx / (sinx + cosx)
= ∫ 2 / 【(1 + u²) * [2u / (1+u²) + (1 - u²) / (1 + u²)]】 du
= 2∫ du / (-u² + 2u + 1)
= 2∫ du / [2 - (u - 1)²]
= 2∫ dy / (2 - y²),y=u - 1
= (1 / 2√2)ln|(y + √2) / (y - √2)| + C
= (1 / 2√2)ln|(u - 1 + √2) / (y - 1 - √2)| + C
= (1 / 2√2)ln|[tan(x / 2) - 1 + √2] / [tan(x / 2) - 1 - √2)| + C
= √2arctanh【[tan(x / 2) - 1] / √2】+ C本回答被提问者和网友采纳
第4个回答 2012-11-13
运用插入辅助角公式 sinx+cosx=(√2)sin(x+π/4)
∫ dx / (sinx + cosx)
=∫ d(x+π/4)/(√2)sin(x+π/4)
=√2/2 ln |tan(x/2+π/8)| +C
∫ dx / (sinx + cosx)
=∫ d(x+π/4)/(√2)sin(x+π/4)
=√2/2 ln |tan(x/2+π/8)| +C
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