Answer to Question #308122 in Differential Equations for Papi Chulo

Let us solve the differential equation

"10x-8y\\sqrt{x^2 +1}\\frac{ dy}{dx }=0,"

which is equivalent to

"\\frac{10x dx}{ \\sqrt{x^2 +1}}=8ydy."

It follows that

"\\int\\frac{10x dx}{ \\sqrt{x^2 +1}}=\\int8ydy."

Therefore, the general solution is

"10\\sqrt{x^2+1}=4y^2+C."

Since "y(0)=9," we get "10=4\\cdot 81+C."

Therefore, "C=-314."

Consequently, the particular solution is

"10\\sqrt{x^2+1}=4y^2-314."