Suppose that in a certain state, all automobile license plates have three uppercase letters followed by four digits. Use the method illustrated in Example 9.2.2 to answer the following questions. (a) How many different license plates are possible? To answer this question, think of creating a license plate as a 6-step process, where steps 1-3 are to choose the uppercase letters to put in positions 1-3 and the remaining steps are to choose the digits to put in the remainin positions. There are 17576 ways to perform steps 1-3, and there are ways to perform the remaining steps. Thus, the number of license plates is (b) How many license plates could begin with A and end in 0? In this case, the number of ways to place the A in Step 1 is 1 (c) How many license plates could begin with LRT? In this case, the number of ways to perform steps 1-3 is 1 and the number of ways to place the 0 in the final step is 1 Thus, the answer is (d) How many license plates are possible in which all the letters and digits are distinct? (e) How many license plates could begin with AB and have all letters and digits distinct? 4 Thus, the answer is

Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
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Suppose that in a certain state, all automobile license plates have three uppercase letters followed by four digits. Use the method illustrated in Example 9.2.2 to answer the following questions.
(a) How many different license plates are possible?
To answer this question, think of creating a license plate as a 6-step process, where steps 1-3 are to choose the uppercase letters to put in positions 1-3 and the remaining steps are to choose the digits to put in the remaining
positions. There are 17576
ways to perform steps 1-3, and there are
ways to perform the remaining steps. Thus, the number of license plates is
(b) How many license plates could begin with A and end in 0?
In this case, the number of ways to place the A in Step 1 is 1
(c) How many license plates could begin with LRT?
In this case, the number of ways to perform steps 1-3 is 1
and the number of ways to place the 0 in the final step is 1
Thus, the answer is
(d) How many license plates are possible in which all the letters and digits are distinct?
Viewing Saved Work Revert to Last Response
(e) How many license plates could begin with AB and have all letters and digits distinct?
4
Thus, the answer is
Transcribed Image Text:Suppose that in a certain state, all automobile license plates have three uppercase letters followed by four digits. Use the method illustrated in Example 9.2.2 to answer the following questions. (a) How many different license plates are possible? To answer this question, think of creating a license plate as a 6-step process, where steps 1-3 are to choose the uppercase letters to put in positions 1-3 and the remaining steps are to choose the digits to put in the remaining positions. There are 17576 ways to perform steps 1-3, and there are ways to perform the remaining steps. Thus, the number of license plates is (b) How many license plates could begin with A and end in 0? In this case, the number of ways to place the A in Step 1 is 1 (c) How many license plates could begin with LRT? In this case, the number of ways to perform steps 1-3 is 1 and the number of ways to place the 0 in the final step is 1 Thus, the answer is (d) How many license plates are possible in which all the letters and digits are distinct? Viewing Saved Work Revert to Last Response (e) How many license plates could begin with AB and have all letters and digits distinct? 4 Thus, the answer is
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