For each positive integer n, find the number of positive integers that are less than 210n which are odd multiples of three that are not multiples of five and are not multiples of seven. Justify your answer, which should be in terms of n.

Nannie Mack

Nannie Mack

Answered question

2021-01-19

For each positive integer n, find the number of positive integers that are less than 210n which are odd multiples of three that are not multiples of five and are not multiples of seven. Justify your answer, which should be in terms of n.

Answer & Explanation

Laaibah Pitt

Laaibah Pitt

Skilled2021-01-20Added 98 answers

Total multiply of k less than n=[n1k}
a) Multiply of 3=[210n13]=[70n13]
=70n
Odd multiply of 3=70n2=35n
b) Odd multiply of 3 and 5
- Total - even
=[210n13,9][210n12,3,9]=14n7n
=7n
c) Odd multiply of 3 and 7
=[210n13,7][210n12,3,7]=10n5n
5n
d) Odd multiply of 3,5 and 7
[210n13,7][210n12,3,5,7]=2nn=n
Answer: 35n7n5n+n=24n

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