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The reciprocal of an integer plus the reciprocal of two times the integer plus two equals 2 over 3 Find the integer?
It is 2.
Is there any integer that has a reciprocal that is an integer?
1 = 1/1 = 1
What is it called when a fraction that has a numerator of one?
It is a reciprocal of an integer.
What always has a numerator of 1?
The reciprocal of a non-zero integer.
What is the reciprocal for 8?
The reciprocal of any positive integer x is equal to 1/x. Therefore, the reciprocal of 8 is equal to 1/8 or one eighth.
The reciprocal of an integer plus the reciprocal of two times the integer plus two equals Find the integer?
2
The reciprocal of an integer plus the reciprocal of two times the integer plus two equals 2 over 3 Find the integer?
It is 2.
The reciprocal of two times a certains integer plus the reciprocal of 2 more than twice the integer equals 724 what is the integer?
??? explain better.
Is there an integer that has a reciprocal that is also an integer?
yes, 1 and -1.
Is the reciprocal of an integer always less than the integer?
No. In fact, the reciprocal of 0 is not defined.
Is there any integer that has a reciprocal that is an integer?
1 = 1/1 = 1
What is it called when a fraction that has a numerator of one?
It is a reciprocal of an integer.
What always has a numerator of 1?
The reciprocal of a non-zero integer.
What is the reciprocal of 56?
The reciprocal of any integer x is equal to 1/x. In this instance, expressed as a proper fraction, the reciprocal of 56 is equal to 1/56.
What is the reciprocal for 8?
The reciprocal of any positive integer x is equal to 1/x. Therefore, the reciprocal of 8 is equal to 1/8 or one eighth.
An integer minus 3 times its reciprocal equals 26over3?
9
The reciprocal of an integer plus the reciprocal of two times the integer plus two equals 23 Find the integer?
This question can be expressed algebraically as: (1/n) + (1/(2n)) + 2 = 23, (1/n) + (1/(2n)) =21, ((1+2)/(2n)) = 21, (3/(2n)) = 21, or 2n = (3/21), 2n = (1/7), so n = (1/14). This, by the way, is an elementary algebraic proof that the solution to the above relation is (1/14). Anyway, to answer the question, reread the question: "[What integer is such that] the reciprocal of the integer...". notice, the reciprocal of (1/14) is 14, which is the integer in question! ^_^
