CosA=5\13 tanB=-15/8 A is4th quadridant B is 2nd quadridant then A+B in which quadridant
Answers
Answered by
13
Step-by-step explanation:
Answered by
3
cosA=5/13
sinA=-√(1-cos^2A) (since theta is in 4th quadrant)
i.e. sinA=-√144/169
=-12/13
tanB=-15/8
sinB=+(15)/√{(-15)^2+(8)^2} (B is in Q2)
i.e. sinB=15/17
cosB=tanB/sinB
i.e. cosB=-15/8 * 17/15
cosB=17/8
now
sin(A+B)=sinAcosB+cosAsinB
sin(A+B)=(-12/13)(17/8)+(5/13)(15/17)
={1/13}(-51/2 + 75/17)
=(1/13)(-710/34)
=-710/442
❤❤ please make a brain list answer❤❤
Similar questions
Physics,
4 months ago
Math,
4 months ago
Business Studies,
8 months ago
Math,
8 months ago
English,
1 year ago