Find tan (a+B), given cot a= -3/4 , csc B= 25/24 , 90° < a < 180° , 90°< B < 180°

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Mathematics Tryphena 5 years 2021-07-28T18:50:51+00:00 2021-07-28T18:50:51+00:00 1 Answers 14 views 0

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Captcha* Giải phương trình 1 ẩn: x + 2 - 2(x + 1) = -x . Hỏi x = ? ( )

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MichaelMet · Answer 1 · 2021-07-28T18:52:13+00:00

Answer:

tan(a + B) = $\frac{4}{3}$

Step-by-step explanation:

cot(a) = $-\frac{3}{4}$

Therefore, tan(a) = $-\frac{4}{3}$

cosec(B) = $\frac{25}{24}$

Since, 1 + cot²(B) = cosec²(B)

1 + cot²(B) = $(\frac{25}{24})^{2}$

cot²(B) = $\frac{625}{576}-1$

cot(B) = $\sqrt{\frac{49}{576}}$

= $\pm \frac{7}{24}$

tan(B) = $\pm \frac{24}{7}$

Since, tan and cot of an angle is negative in II quadrant,

Therefore, tan(B) = $-\frac{24}{7}$

Since, tan(a + B) = $\frac{\text{tan}(a)+\text{tan}(B)}{1-\text{tan(a)tan(B)}}$

By substituting the values in the identity,

tan(a + B) = $\frac{-\frac{4}{3}-\frac{24}{7}}{1-(-\frac{4}{3})(-\frac{24}{7})}$

= $\frac{-\frac{28}{21}-\frac{72}{21}}{1-(\frac{32}{7})}$

= $\frac{-\frac{100}{21} }{\frac{7-32}{7} }$

= $\frac{100}{21}\times \frac{7}{25}$

= $\frac{4}{3}$

Therefore, tan(a + B) = $\frac{4}{3}$ is the answer.