Task 2 The development department is willing to develop an algorithm to its production lines. The company has 9 different production lines that wish to control its production rate based on customer needs. Production line number 1 can produce 7 different products (PL1 can produce 1 to 7) different transducers that can produce per day 150 (transducer/day) to 1050 (transducer/day). Production line 2 has 9 (PL1 can produce 1 to 9) different transducers that can produce per day 170 (transducer/day) to 1530 (transducer/day). The initial production rate follow an arithmetic progression such that PL1( product 1) = 150, PL2 (product 1) =170, and so on. The production rates within the same production line follow an arithmetic progression sequence. However, the number of different products per line increases using geometric progression (N of different products per line = 7, 9,.....) 1. Determine the general formulas of the production rates 2. 3. Determine a general formula for the number of different products per line. Construct a sequence of the sum of the production rates per line (S1, S2, ..S9). Is there any relation between these sums?

Task 2 The development department is willing to develop an algorithm to its production lines. The company has 9 different production lines that wish to control its production rate based on customer needs. Production line number 1 can produce 7 different products (PL1 can produce 1 to 7) different transducers that can produce per day 150 (transducer/day) to 1050 (transducer/day). Production line 2 has 9 (PL1 can produce 1 to 9) different transducers that can produce per day 170 (transducer/day) to 1530 (transducer/day). The initial production rate follow an arithmetic progression such that PL1( product 1) = 150, PL2 (product 1) =170, and so on. The production rates within the same production line follow an arithmetic progression sequence. However, the number of different products per line increases using geometric progression (N of different products per line = 7, 9,.....) 1. Determine the general formulas of the production rates 2. 3. Determine a general formula for the number of different products per line. Construct a sequence of the sum of the production rates per line (S1, S2, ..S9). Is there any relation between these sums?

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Description: can you answer it, please? Task 2The development department is willing to develop an algorithm to its production lines. Thecompany has 9 different production lines that wish to control its production rate based oncustomer needs. Production line numbe

Mathematics For Machine Technology

8th Edition

ISBN:9781337798310

Author:Peterson, John.

Publisher:Peterson, John.

Chapter87: An Introduction To G- And M-codes For Cnc Programming

Section: Chapter Questions

Problem 10A

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Topic Video

Question

can you answer it, please?

Task 2
The development department is willing to develop an algorithm to its production lines. The
company has 9 different production lines that wish to control its production rate based on
customer needs. Production line number 1 can produce 7 different products ( PL1 can produce
1 to 7) different transducers that can produce per day 150 (transducer/day) to 1050
(transducer/day). Production line 2 has 9 (PL1 can produce 1 to 9) different transducers that
can produce per day 170 (transducer/day) to 1530 (transducer/day). The initial production
rate follow an arithmetic progression such that PL1( product 1) = 150, PL2(product 1) =170,
and so on. The production rates within the same production line follow an arithmetic
progression sequence. However, the number of different products per line increases using
geometric progression ( N of different products per line = 7, 9, ..)
Determine the general formulas of the production rates
Determine a general formula for the number of different products per line.
Construct a sequence of the sum of the production rates per line ( S1, S2, .S9). Is
there any relation between these sums?
Determine the maximum number of different products that can be produced at this
factory.
1.
2.
3.
4.

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