Step 1: The first step that we always take when evaluating the limit of a trigonometric function
is to rearrange the function so that it looks like some combination of the limits above. We can
do this by factoring sin x out of the numerator.Now break this into limits that we can easily evaluate.Step 2: Now if we take the limit as x → 0 we get 4(1)(0) = 0.- D This is a very basic differential equation. See this page for a discussion of separation of
variables.
Step 1: First, separate the variables. Then, we gety dy = (3x^2 + 2) dxStep 2: Now integrate both sides.∫^ y dy = ∫ (3x
(^2) + 2) dx
= x^3 + 2x + C
Notice how we use only one constant. All we have to do now is solve for C. We do this by
plugging in 2 for x and 4 for y.