What is the differential equation whose solution represents the family c(y + c)^2 = x^3?(a) [2x/3 *(dy/dx) – y][x/3 *dy/dx]^2 = x^3(b) [x/3 *(dy/dx) – y][x/3 *dy/dx]^2 = x^3(c) [2x/3 *(dy/dx) – y][ 2x/3 *dy/dx]^2 = x^3(d) [x/3 *(dy/dx) – y][ 2x/3 *dy/dx]^2 = x^3This question was addressed to me during an interview for a job.My question is taken from Linear First Order Differential Equations in portion Differential Equations of Mathematics – Class 12

What is the differential equation whose solution represents the family

1.	What is the differential equation whose solution represents the family c(y + c)^2 = x^3?(a) [2x/3 (dy/dx) – y][x/3 dy/dx]^2 = x^3(b) [x/3 (dy/dx) – y][x/3 dy/dx]^2 = x^3(c) [2x/3 (dy/dx) – y][ 2x/3 dy/dx]^2 = x^3(d) [x/3 (dy/dx) – y][ 2x/3 dy/dx]^2 = x^3This question was addressed to me during an interview for a job.My question is taken from Linear First Order Differential Equations in portion Differential Equations of Mathematics – Class 12
Answer» Correct choice is (c) [2x/3 (dy/dx) – y][ 2x/3 dy/dx]^2 = x^3 The best I can explain: The given FAMILY is c(y + c)^2 = x^3 Differentiating once, we get c[2(y + c)]dy/dx = 3x^2 => 2x^3 (y + c)/(y + c)^2 * dy/dx = 3x^2 => 2x^3/(y + c) * dy/dx = 3x^2 Or, 2x (y + c)/(y + c)^2 * dy/dx = 3 => 2x/3 [dy/dx] = (y + c) => c = 2x/3 [dy/dx] – y Substituting c back into equation (1), we get [2x/3 (dy/dx) – y][ 2x/3 dy/dx]^2 = x^3 which is the REQUIRED differential equation

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