Find equation of the level curve of the function h(x, y) = y ^ 3 * sin(x + pi/2) that passes throughthe point (r.2).
Question
Find equation of the level curve of the function h(x, y) = y ^ 3 * sin(x + pi/2) that passes throughthe point (r.2).
Solution
To find the equation of the level curve of the function h(x, y) = y ^ 3 * sin(x + pi/2) that passes through the point (r, 2), we need to follow these steps:
Step 1: Substitute the given point (r, 2) into the function h(x, y) to obtain an equation in terms of r: h(r, 2) = 2^3 * sin(r + pi/2) h(r, 2) = 8 * sin(r + pi/2)
Step 2: Simplify the equation obtained in step 1: h(r, 2) = 8 * sin(r + pi/2) h(r, 2) = 8 * sin(r) * cos(pi/2) + sin(pi/2) * cos(r) h(r, 2) = 8 * sin(r) * 0 + 1 * cos(r) h(r, 2) = cos(r)
Step 3: The equation of the level curve passing through the point (r, 2) is h(r, 2) = cos(r).
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