a) number of license plates =103*263 =17576000
b) number of license plates =10*9*8*26*25*24 =11232000
c) number of license plates = probability =11232000/17576000 =0.639053
License plates: In a certain state, license plates consist of three digits from 0 to 9...
In a certain state, license plates consist of three letters followed by three numbers. 1. How many different license plates can be made if the letter and number carn repeat? (5pts) appears more than once? (5pts) number appears more than once? (5pts) 2. How many different license plates can be made in which no letter or number 3. A license plate is chosen at random. What is the probability that no letter or
License plates: In a certain state, license plates consist of five digits from 0 to 9 followed by four letters. Assume the numbers and letters are chosen at random. Replicates are allowed. Part 1 of 3 х (a) How many different license plates can be formed? The number of different license plates is 0.45697000000 Correct Answer: The number of different license plates is 45,697,600,000 Part: 1/3 Part 2 of 3 (b) How many different license plates have the letters J-U-N-E...
License plates in a particular state are to consist of 4 digits followed by 2 uppercase letters. a) How many different license plates can there be in this state if repetition of letters and numbers is permitted? b) How many different license plates can there be in this state if repetition of letters and numbers is not permitted? c) How many different license plates can there be in this state if the first and second digits must be even, and...
D Question 34 In a certain state, license plate numbers consist of three letters followed by three digits. 20 pts a) How many license plates are possible? b) How many license plates are there that use no repeated characters? (1.e. no repeated digits and no repeated letters) c) What is the probability that a given license plate has no repeated characters? d) What is the probability that a given license plate has at least one repeated character? 12pt Paragraph B...
12. In certain state, license plates consist each of two letter follower by 3 digits. (a) How many different license plates are there? (b) How many different license plates are there that do not have any repeated letter or digit? 13. Use the binomial theorem and the Pascal triangle to expand (2x-) 12. In certain state, license plates consist each of two letter follower by 3 digits. (a) How many different license plates are there? (b) How many different license...
A license plate consists of two letters followed by three single digits. (a) How many different license plates can be made? (b) How many different license plates can be made if no two-character U.S. state abbreviations are allowed for the two letters?
7. Suppose that in a certain state, all automobile license plates have three uppercase letters followed by three digits. (a) (5 points) How many different license plates are possible? (b) (5 points) How many license plates could begin with A, end in 0, and in which all the letters and digits are distinct? (c) (5 points) What is the probability that a randomly chosen license plates begins with A, ends with O, and all its letters and digits are distinct?
5. Section Exe Question 36 of 37 (1 point) Attempt 1 of 3 View question in a popun License plates: In a certain state, license plates consist of five digits from 0 to 9 followed by four letters. Assume the numbers and letters are chosen at random. Replicates are allowed. Part: 0/3 Part 1 of 3 (a) How many different license plates can be formed? The number of different license plates is
1. Suppose a license plate number in this state can only contain capital letters and digits and can only be any string of the form: Letter-Letter-Letter-Digit-Digit-Digit-Digit How many license plate numbers are possible if no digit appears more than once?
Question 36 of 37 (1 point) Attempt 1 of 3 View question in a popup 5.4 Section Exercise License plates: In a certain state, license plates consist of five digits from 0 to 9 followed by four letters. Assume the numbers and letters are chosen at random. Replicates are allowed. Part 1 of 3 х (a) How many different license plates can be formed? The number of different license plates is 0.45697000000 nh Correct Answer: The number of different license...