Differential Equations and Initial Conditions

y(x) = x^3 + C/x

y(x) = x^3 - C/x

y(x) = x^2 - C/x

y(x) = x^3 - Cx

Substituting y into the equation

Solving for C

Finding the derivative y'

Finding the second derivative

3x^2 - Cx^-2

3x^2 + Cx^-2

3x^2 + C/x

3x^2 - C/x

2x^3

4x^3

8x^3

6x^3

y(4) = 10

y(2) = 6

y(1) = 4

y(3) = 8

Set 6 equal to 2^3 - C/2

Set 6 equal to 2^2 + C/2

Set 6 equal to 2^3 + C/2

Set 6 equal to 2^2 - C/2

C = -4

C = 2

C = 4

C = -2

The solution does not fit the direction field

The solution fits the direction field and satisfies the initial condition

The solution is a straight line

The solution is a parabola

The maximum points of the function

The intercepts of the function

The curvature of the function

The slopes of the tangent lines to the function

y(x) = x^3 + 2/x

y(x) = x^3 - 2/x

y(x) = x^3 - 4/x

y(x) = x^3 + 4/x