Aseparable differential equation is a first-order differential equation that can be algebraically manipulated to look like:
a) f(y)dy = g(x)dx
b) f(x)dx + f(y)dy
c) g(y)dx = f(x)dx
d) f(x)dx = f(y)dy
e) both f(y)dy = g(x)dx and f(x)dx = f(y)dy

the system of inequalities is

step-by-step explanation:

step 1

find the equation of the dashed line

we have the points

(0,0) and (3,1)

the line passes through the origin, so, is a direct variation

find the slope

the equation of the dashed line is

the solution of the inequality a s the shaded area above the dashed line

therefore

the equation of the inequality a is

step 2

find the equation of the solid line

we have the points

(4,0) and (0,4)

find the slope

the equation of the solid line is

the solution of the inequality b s the shaded area below the solid line

therefore

the equation of the inequality b is

step 3

the system of inequalities is

the answer is b.

step-by-step explanation: