8Th letter in the Greek alphabet.
1Go ahead and solve the above expression for the cosine of θ.
2If I know the angle θ, how do I find the velocity?
3The angle formed between the rods was referred to as θ .
4In y-equation, it has the sin of θ but I have cosine.
5As θ goes to zero, the hands push direction towards the rotation point.
6This means that the time derivatives of θ 2 can be rather complicated.
7See, this triangle has the same value for cosine of θ.
8First, let me find the speed of the ice as a function of θ.
9Moreover, the magnetically ordered temperature θ deduced from the relaxation rate vanishes at optimal doping.
10Finally, I am using θ as the angle this human is tilted above the horizontal.
11Frequency sweep and creep tests revealed decreasing tan θ values with increasing NP-800and DAAA concentrations.
12Also suppose that the magnetic field makes an angle θ with respect to the n-hat vector.
13If you know θ and r, you can find the length L. But here is the problem.
14I can use the angle θ to find the components of velocity and the equations of motion.
15Let's say that a human takes a stride with an initial velocity v at an angle of θ.
16This means I can write: As θ 1 increases, so does the angular separation between the head and body.