An electronics company produces transistors, resistors, and computer chips. Each transistor requires 3 units of copper,...
An electronics company produces transistors, resistors, and computer chips. Each transistor requires 3 units of copper, 1 units of zinc, and 2 units of glass. Each resistor requires 3 units of copper, 2 units of zinc, and 1 units of glass and each computer chip requires 2 units of copper, 1 units of zinc, and 2 units of glass. How many of each product can be made with 2090 units of copper, 890 units of zinc, and 1330 units of...
An electronics company produces transistors, resistors, and computer chips. Each transistor requires 3 units of copper, 2 units of zinc, and 1 unit of glass. Each resistor requires 3, 1, and 2 units of the three materials, and each computer chip requires 2, 1, and 2 units of these materials, respectively. How many of each product can be made with 2540 units of copper, 1200 units of zinc, and 1800 units of glass? Solve this exercise by using the inverse...
Utilizing matrix inverse: An electronics company produces transistors, resistors, and computer chips Each of these components requires units of three different materials; copper, zinc, and glass as summarized in the following table Glass Component Transistors Resistors Computer chips Copper Linc Supplies of these materials vary from week to week, so the company needs to determine a different production run each week. For example, one week the total amounts of materials available are 960 units of copper. 510 units of zinc,...
A rental truck company plans to spend $13 million on 320 new vehicles. Each commercial van will cost $25,000, each small truck $50,000, and each large truck $80,000. Past experience shows that they need twice as many vans as small trucks. How many of each type of vehicle can they buy? Write a linear system of equations. Let x be the number of vans, y be the number of small trucks, and z be the number of large trucks. Choose...