Graph the inequalities to find the vertices of the shaded region: (2, 3) and (8, 0).
Now, evaluate the the function C = x + 3y at those vertices to find the minimum value.
C = x + 3y at (2, 3) ⇒ C = (2) + 3(3) ⇒ C = 2 + 9 ⇒ C = 11
C = x + 3y at (8, 0) ⇒ C = (8) + 3(0) ⇒ C = 8 + 0 ⇒ C = 8
The minimum value occurs at (8, 0) with a minimum of C = 8
Answer: A
Answer:
Option (A)
Step-by-step explanation:
Here, x+ 2y =8
c=x+3y
x≥2
y≥0
By considering the options (A) and (B)
For option (A)
x=8 and y=0
x+2y=8
put values of x and y in equation
8+2×0=8, which satisfies the equation
now c= 8+3×0=8
Now, for option (B)
x=2 and y=3
x+2y=8
put values of x and y
2+2×3=8, which satisfies the equation.
now c= 2+3×3=11
As we have to find the minimum value of c.
hence we take c=8
Hence, option (A) is correct.
