Madelyn Adams

A triangle has sides A, B, and C. The angle between sides A and B is #(5pi)/6# and the angle between sides B and C is #pi/12#. If side B has a length of 9, what is the area of the triangle?

How do you convert #rsintheta = -2# into rectangular form?

How do you graph #y = -cos ( x- pi/4)#?

How do you verify #csc^2(theta)(1-cos^2(theta))=1#?

How do you solve the triangle given B=19, a=51, c=61?

If cos theta=0.6 and 270<theta<360, find the exact value of sin 2 theta ?

What is the maximum value of #4 sin 3x#?

How do you solve #sin(pi/5-pi/2)#?

How do you work out #cos(86°)=((hcot(9°))^2 + (hcot(12°))^2 - 600^2) / (2*hcot(9°)*hcot(12°))#?

How do you simplify the expression #1-2sin^2 ( theta / 3 )# by using a double-angle formula?

How do you convert # (r-1)^2= - sin theta costheta +cos^2theta# to Cartesian form?

Sine (45 + x )?

How do you determine whether #triangle ABC# has no, one, or two solutions given #A=75^circ, a=14, b=11#?

How do you find an angle between 0 and 2 pi that is coterminal with -19/24 pi express answer in radians?

How do you prove #Sinx/Cosx+Cosx/Sinx = (Sin^2xCos^2x)/(CosxSinx)#?

How do you solve #1 - 2(sinx)^2 = cosx, 0 <= x <= 360#. Solve for #x#?

How do you solve #sin(x) = cos(x)#?

If #sectheta+tantheta=3/2#, what is the value of #sintheta#?

How do you find the exact value of the third side given #triangle DEF#, #d=sqrt3#, e=5, and #mangleF=pi/6#?

How do you evaluate #sin^-1(sin((7pi)/10))#?