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### Question

y varies directly with the cube of x and inversely with the square root of z.

### Answer #1 for Questions: y varies directly with the cube of x and inversely with the square root of z.

**Answer:**

__x varies directly with the cube of y and inversely with the square root of z:__

__x varies directly with the cube of y and inversely with the square root of z: __

__x varies directly with the cube of y and inversely with the square root of z: x = ky3/√z where k is the constant of proportion__

__x varies directly with the cube of y and inversely with the square root of z: x = ky3/√z where k is the constant of proportion __

__x varies directly with the cube of y and inversely with the square root of z: x = ky3/√z where k is the constant of proportion 571.66666666667 = k(7)3/√9__

__x varies directly with the cube of y and inversely with the square root of z: x = ky3/√z where k is the constant of proportion 571.66666666667 = k(7)3/√9 __

__x varies directly with the cube of y and inversely with the square root of z: x = ky3/√z where k is the constant of proportion 571.66666666667 = k(7)3/√9 Note.. 571.66666666667 = 571 2/3 = 1715/3__

__x varies directly with the cube of y and inversely with the square root of z: x = ky3/√z where k is the constant of proportion 571.66666666667 = k(7)3/√9 Note.. 571.66666666667 = 571 2/3 = 1715/3 __

__x varies directly with the cube of y and inversely with the square root of z: x = ky3/√z where k is the constant of proportion 571.66666666667 = k(7)3/√9 Note.. 571.66666666667 = 571 2/3 = 1715/3 1715/3 = 343k/3__

__x varies directly with the cube of y and inversely with the square root of z: x = ky3/√z where k is the constant of proportion 571.66666666667 = k(7)3/√9 Note.. 571.66666666667 = 571 2/3 = 1715/3 1715/3 = 343k/3 __

__x varies directly with the cube of y and inversely with the square root of z: x = ky3/√z where k is the constant of proportion 571.66666666667 = k(7)3/√9 Note.. 571.66666666667 = 571 2/3 = 1715/3 1715/3 = 343k/3 3(1715/3) = 343k__

__x varies directly with the cube of y and inversely with the square root of z: x = ky3/√z where k is the constant of proportion 571.66666666667 = k(7)3/√9 Note.. 571.66666666667 = 571 2/3 = 1715/3 1715/3 = 343k/3 3(1715/3) = 343k __

__x varies directly with the cube of y and inversely with the square root of z: x = ky3/√z where k is the constant of proportion 571.66666666667 = k(7)3/√9 Note.. 571.66666666667 = 571 2/3 = 1715/3 1715/3 = 343k/3 3(1715/3) = 343k 1715 = 343k__

__x varies directly with the cube of y and inversely with the square root of z: x = ky3/√z where k is the constant of proportion 571.66666666667 = k(7)3/√9 Note.. 571.66666666667 = 571 2/3 = 1715/3 1715/3 = 343k/3 3(1715/3) = 343k 1715 = 343k __

__x varies directly with the cube of y and inversely with the square root of z: x = ky3/√z where k is the constant of proportion 571.66666666667 = k(7)3/√9 Note.. 571.66666666667 = 571 2/3 = 1715/3 1715/3 = 343k/3 3(1715/3) = 343k 1715 = 343k k = 1715/343 = 5__

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### Answer #2 for Questions: y varies directly with the cube of x and inversely with the square root of z.

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