Question

$find \: the \: maxima \: value \: of \: z = 3x + 2y \\ subjet \: to \: the \: - 2x + 3y \leqslant 9 \: x - 5y \geqslant - 20 \: \:x \: y \geqslant 0$
9, x-5y2-20, x, y20​

Answer 1

Answer:

Step-by-step explanation:

D is the midpoint of the side BC of a ∆ ABC . E is any point on DC. Through the point D a straight line parallel to EA is drawn which intersects AB at the point F. Prove that ∆ BEF = ½ ∆ ABCD is the midpoint of the side BC of a ∆ ABC . E is any point on DC. Through the point D a straight line parallel to EA is drawn which intersects AB at the point F. Prove that ∆ BEF = ½ ∆ ABCD is the midpoint of the side BC of a ∆ ABC . E is any point on DC. Through the point D a straight line parallel to EA is drawn which intersects AB at the point F. Prove that ∆ BEF = ½ ∆ ABCD is the midpoint of the side BC of a ∆ ABC . E is any point on DC. Through the point D a straight line parallel to EA is drawn which intersects AB at the point F. Prove that ∆ BEF = ½ ∆ ABCD is the midpoint of the side BC of a ∆ ABC . E is any point on DC. Through the point D a straight line parallel to EA is drawn which intersects AB at the point F. Prove that ∆ BEF = ½ ∆ ABCD is the midpoint of the side BC of a ∆ ABC . E is any point on DC. Through the point D a straight line parallel to EA is drawn which intersects AB at the point F. Prove that ∆ BEF = ½ ∆ ABCD is the midpoint of the side BC of a ∆ ABC . E is any point on DC. Through the point D a straight line parallel to EA is drawn which intersects AB at the point F. Prove that ∆ BEF = ½ ∆ ABCD is the midpoint of the side BC of a ∆ ABC . E is any point on DC. Through the point D a straight line parallel to EA is drawn which intersects AB at the point F. Prove that ∆ BEF = ½ ∆ ABCD is the midpoint of the side BC of a ∆ ABC . E is any point on DC. Through the point D a straight line parallel to EA is drawn which intersects AB at the point F. Prove that ∆ BEF = ½ ∆ ABCD is the midpoint of the side BC of a ∆ ABC . E is any point on DC. Through the point D a straight line parallel to EA is drawn which intersects AB at the point F. Prove that ∆ BEF = ½ ∆ ABCD is the midpoint of the side BC of a ∆ ABC . E is any point on DC. Through the point D a straight line parallel to EA is drawn which intersects AB at the point F. Prove that ∆ BEF = ½ ∆ ABCD is the midpoint of the side BC of a ∆ ABC . E is any point on DC. Through the point D a straight line parallel to EA is drawn which intersects AB at the point F. Prove that ∆ BEF = ½ ∆ ABCD is the midpoint of the side BC of a ∆ ABC . E is any point on DC. Through the point D a straight line parallel to EA is drawn which intersects AB at the point F. Prove that ∆ BEF = ½ ∆ ABCD is the midpoint of the side BC of a ∆ ABC . E is any point on DC. Through the point D a straight line parallel to EA is drawn which intersects AB at the point F. Prove that ∆ BEF = ½ ∆ ABCD is the midpoint of the side BC of a ∆ ABC . E is any point on DC. Through the point D a straight line parallel to EA is drawn which intersects AB at the point F. Prove that ∆ BEF = ½ ∆ ABCD is the midpoint of the side BC of a ∆ ABC . E is any point on DC. Through the point D a straight line parallel to EA is drawn which intersects AB at the point F. Prove that ∆ BEF = ½ ∆ ABCD is the midpoint of the side BC of a ∆ ABC . E is any point on DC. Through the point D a straight line parallel to EA is drawn which intersects AB at the point F. Prove that ∆ BEF = ½ ∆ ABCD is the midpoint of the side BC of a ∆ ABC . E is any point on DC. Through the point D a straight line parallel to EA is drawn which intersects AB at the point F. Prove that ∆ BEF = ½ ∆ ABCD is the midpoint of the side BC of a ∆ ABC . E is any point on DC. Through the point D a straight line parallel to EA is drawn which intersects AB at the point F. Prove that ∆ BEF = ½ ∆ ABCD is the midpoint of the side BC of a ∆ ABC . E is any point on DC. Through the point D a straight line parallel to EA is drawn which intersects AB at the point F. Prove that ∆ BEF = ½ ∆ ABCD is the midpoint of the side BC of a ∆ ABC . E is any point on DC. Through the point D a straight line parallel to EA is drawn which intersects AB at the point F. Prove that ∆ BEF = ½ ∆ ABCD is the midpoint of the side BC of a ∆ ABC . E is any point on DC. Through the point D a straight line parallel to EA is drawn which intersects AB at the point F. Prove that ∆ BEF = ½ ∆ ABC