The required maximum value of the function C = x - 2y is 4.
Given that,
The function C = x - 2y is maximized at the vertex point of the feasible region at (8, 2). What is the maximum value is to be determined.
<h3>What is the equation?</h3>
The equation is the relationship between variables and represented as y =ax +m is an example of a polynomial equation.
Here,
Function C = x - 2y
At the vertex point of the feasible region at (8, 2)
C = 8 - 2 *2
C= 4
Thus, the required maximum value of the function C = x - 2y is 4.
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We found the factors and prime factorization of 9 and 25. The biggest common factor number is the GCF number. So the greatest common factor 9 and 25 is 1.
X+y=51
x-y=15
adding equation
2x=66
x=33
y=51-33
y=18
The range would be 8!
Explanation:
The lowest number of the set is 12.
The highest number of the set is 20.
Subtract both to get the range.
20 - 12 = 8
or
20
-12
——
8
The range is 8 or C.
That would be 9,000,000,000 times 8, which equals 72,000,000,000. Since 9*8 is 72 accepts there's a 9 million.
