If #log_12 27 = a#, then what is #log_6 16#? Trigonometry Right Triangles Relating Trigonometric Functions 1 Answer P dilip_k Nov 27, 2016 A good problem Given #a=log_12 27=log_(12)3^3=3log_(12)3# #=>a=3/log_3 12=3/log_3(3xx2^2)# #=>a=3/(log_3 3+2log_3 2# #=>a=3/(1+2log_3 2)# #=>(1+2log_3 2)=3/a# #=>log_3 2=1/2(3/a-1)=(3-a)/(2a)# #=>log_2 3=(2a)/(3-a)# Now #log_6 16=log_6 2^4=4log_6 2=4/log_2 6# #=4/log_2 (2xx3)=4/(log_2 2+log_2 3# #=4/(1+log_2 3)=4/(1+(2a)/(3-a)# #=(4(3-a))/(3-a+2a)=(12-4a)/(3+a)# Answer link Related questions What does it mean to find the sign of a trigonometric function and how do you find it? What are the reciprocal identities of trigonometric functions? What are the quotient identities for a trigonometric functions? What are the cofunction identities and reflection properties for trigonometric functions? What is the pythagorean identity? If #sec theta = 4#, how do you use the reciprocal identity to find #cos theta#? How do you find the domain and range of sine, cosine, and tangent? What quadrant does #cot 325^@# lie in and what is the sign? How do you use use quotient identities to explain why the tangent and cotangent function have... How do you show that #1+tan^2 theta = sec ^2 theta#? See all questions in Relating Trigonometric Functions Impact of this question 37214 views around the world You can reuse this answer Creative Commons License