Minimize Z = 2x + 3y subject to constraints x + y ≥ 6, 2x + y ≥ 7, x + 4y ≥ 8, x ≥ 0, y ≥ 0 - Mathematics and Statistics

प्रश्न

Minimize Z = 2x + 3y subject to constraints

x + y ≥ 6, 2x + y ≥ 7, x + 4y ≥ 8, x ≥ 0, y ≥ 0

तक्ता

आकृती

उत्तर

To draw the feasible region, construct table as follows:

Inequality	x + y ≥ 6	2x + y ≥ 7	x + 4y ≥ 8
Corresponding equation (of line)	x + y = 6	2x + y = 7	x + 4y = 8
Intersection of line with X-axis	(6, 0)	`(7/2, 0)`	(8, 0)
Intersection of line with Y-axis	(0, 6)	(0, 7)	(0, 2)
Region	Non-origin side	Non-origin side	Non-origin side

Shaded portion XABCDY is the feasible region, whose vertices are A(8, 0), B, C and D(0, 7).

B is the point of intersection of x + 4y = 8 and x + y = 6.

Solving the above equations, we get

x = `16/3`, y = `2/3`

∴ B ≡ `(16/3, 2/3)`

C is the point of intersection of 2x + y = 7 and x + y = 6.

Solving the above equations, we get

x = 1, y = 5

∴ C ≡ (1, 5)

Here, the objective function is Z = 2x + 3y

∴ Z at A(8, 0) = 2(8) + 3(0) = 16

Z at B`(16/3, 2/3)`

= `2(16/3) + 3(2/3)`

= `32/3 + 6/3`

= `38/3`

Z at C(1, 5) = 2(1) + 3(5) = 17

Z at D(0, 7) = 2(0) + 3(7) = 21

∴ Z has minimum value `38/3` at x = `16/3` and y = `2/3`.

shaalaa.com

Mathematical Formulation of Linear Programming Problem

या प्रश्नात किंवा उत्तरात काही त्रुटी आहे का?

Q 12 Q 11 Q 1

पाठ 2.6: Linear Programming - Q.4 (D)

APPEARS IN

एससीईआरटी महाराष्ट्र Mathematics and Statistics (Commerce) [English] 12 Standard HSC

पाठ 2.6 Linear Programming
Q.4 (D) | Q 12

2021-2022 (March) Model set 2 shaalaa.com (with solutions)

Q 5.B.i | 4 marks

संबंधित प्रश्‍न

The postmaster of a local post office wishes to hire extra helpers during the Deepawali season, because of a large increase in the volume of mail handling and delivery. Because of the limited office space and the budgetary conditions, the number of temporary helpers must not exceed 10. According to past experience, a man can handle 300 letters and 80 packages per day, on the average, and a woman can handle 400 letters and 50 packets per day. The postmaster believes that the daily volume of extra mail and packages will be no less than 3400 and 680 respectively. A man receives Rs 225 a day and a woman receives Rs 200 a day. How many men and women helpers should be hired to keep the pay-roll at a minimum ? Formulate an LPP and solve it graphically.

A company produces two types of goods A and B, that require gold and silver. Each unit of type A requires 3 g of silver and 1 g of golds while that of type B requires 1 g of silver and 2 g of gold. The company can procure a maximum of 9 g of silver and 8 g of gold. If each unit of type A brings a profit of Rs 40 and that of type B Rs 50, formulate LPP to maximize profit.

A small manufacturing firm produces two types of gadgets A and B, which are first processed in the foundry, then sent to the machine shop for finishing. The number of man-hours of labour required in each shop for the production of each unit of A and B, and the number of man-hours the firm has available per week are as follows:

Gadget	Foundry	Machine-shop
A	10	5
B	6	4
Firm's capacity per week	1000	600

The profit on the sale of A is Rs 30 per unit as compared with Rs 20 per unit of B. The problem is to determine the weekly production of gadgets A and B, so that the total profit is maximized. Formulate this problem as a LPP.

The corner points of the feasible region determined by the following system of linear inequalities:
2x + y ≤ 10, x + 3y ≤ 15, x, y ≥ 0 are (0, 0), (5, 0), (3, 4) and (0, 5). Let Z = px + qy, where p, q > 0. Condition on p and q so that the maximum of Z occurs at both (3, 4) and (0, 5) is

A firm manufactures two products, each of which must be processed through two departments, 1 and 2. The hourly requirements per unit for each product in each department, the weekly capacities in each department, selling price per unit, labour cost per unit, and raw material cost per unit are summarized as follows:

	Product A	Product B	Weekly capacity
Department 1	3	2	130
Department 2	4	6	260
Selling price per unit	₹ 25	₹ 30
Labour cost per unit	₹ 16	₹ 20
Raw material cost per unit	₹ 4	₹ 4

The problem is to determine the number of units to produce each product so as to maximize total contribution to profit. Formulate this as a LPP.

Choose the correct alternative:

The value of objective function is maximize under linear constraints.

Choose the correct alternative :

The maximum value of z = 10x + 6y, subjected to the constraints 3x + y ≤ 12, 2x + 5y ≤ 34, x ≥ 0, y ≥ 0 is.

State whether the following is True or False :

The region represented by the inqualities x ≤ 0, y ≤ 0 lies in first quadrant.

Solve the following problem :

Minimize Z = 2x + 3y Subject to x – y ≤ 1, x + y ≥ 3, x ≥ 0, y ≥ 0

Solve the following problem :

A factory produced two types of chemicals A and B The following table gives the units of ingredients P & Q (per kg) of Chemicals A and B as well as minimum requirements of P and Q and also cost per kg. of chemicals A and B.

Ingredients per kg. /Chemical Units	A (x)	B (y)	Minimum requirements in
P	1	2	80
Q	3	1	75
Cost (in ₹)	4	6

Find the number of units of chemicals A and B should be produced so as to minimize the cost.

Solve the following problem :

A firm manufacturing two types of electrical items A and B, can make a profit of ₹ 20 per unit of A and ₹ 30 per unit of B. Both A and B make use of two essential components, a motor and a transformer. Each unit of A requires 3 motors and 2 transformers and each unit of B requires 2 motors and 4 transformers. The total supply of components per month is restricted to 210 motors and 300 transformers. How many units of A and B should be manufacture per month to maximize profit? How much is the maximum profit?

Choose the correct alternative:

The minimum value of Z = 4x + 5y subjected to the constraints x + y ≥ 6, 5x + y ≥ 10, x, y ≥ 0 is