Why do you think that it can be reduced to a Clairaut's form of ODE in order to solve it ? \{(\frac{dy}{dx})^2+1\}(1-\frac{y}{x})^2=(1+\frac{y}{x}\frac{dy}{dx})^2 Obviously this is an ODE of the ...

Connecting the origin with two adjacent vertices of the octagon you obtain an isosceles triangle, and halving that a right triangle. The remaining angles of the latter are 45^\circ and 22.5^\circ. ...

"I am not sure why y is a function of x what that means or[...]" The whole reason for the word "implicit" is that y will be a function of x. That comes before you talk about differentiation. ...

Hint: You've fallen victim to Freshman's Dream by assuming: (a + b)^{-1} = a^{-1} + b^{-1} You would need to, instead, find a common denominator and combine, or apply the power rule when ...

If x(0)=0 and y(0)\gt0, then x(t)=0 for every t and y(t)\to0 when t\to\infty. If x(0)\gt0 and y(0)=0, then y(t)=0 for every t and x(t)\to2 when t\to\infty. Hence x(t) ...

Write the equation in this form (x^{3}-2xy)\mathrm dy + (x+2y^{2})\mathrm dx= 0 Let be F(x,y) = x+2y^{2} and G(x,y)=x^3-2xy \dfrac{\partial G}{\partial x}=2x^2-2y\not=4y=\dfrac{\partial F}{\partial y} ...