Answer:
cot x and sec x
Step-by-step explanation:
Given are 4 trignometric functions defined in the interval [0,\pi]
We are asked to identity the functions which can take values more than 1.
We have
[tex]f(x)=sinx : f(x)= cos x[/tex]
have values always between -1 and 1 for any value of x
Hence sinx and cosx cannot take values greater than 1.
[tex]f(x) =cotx[/tex]
This value being ratio of cos to sin will become greater than 1 whenever cos >sin value.
SO this function can take values >1
[tex]f(x)=secx[/tex]
This function being reciprocal of cos function always can take values outside
(-1,1)
Hence this value can be greater than 1
