An operation * on z^(+) ( the set of all...

An operation * on `z^(+)` ( the set of all non-negative integers) is defined as ` a * b = |quad a -b|, AA q,b in z^(+)`.Is * a binary operation on `z^(+)`?

Promotional Banner

Promotional Banner

Topper's Solved these Questions

II PUC JULY -2016
OSWAAL PUBLICATION|Exercise PART-B ( II. Answer any ten questions: )|14 Videos
II PUC JULY -2016
OSWAAL PUBLICATION|Exercise PART-C ( III. Answer any ten questions: )|14 Videos
II PUC APRIL 2020 CLASS - XII
OSWAAL PUBLICATION|Exercise PART - E|2 Videos
II PUC MARCH - 2017
OSWAAL PUBLICATION|Exercise PART - E|3 Videos

Similar Questions

Explore conceptually related problems

An operation ** on Z^(**) (the set of all non-negative integers) is defined as a**b = a-b, AA a, b epsilon Z^(+) . Is ** binary operation on Z^(+) ?

Define a binary operation on a set

The operation * defined a**b = a . Is * a binary operation on z.

On Z defined * by a ** b = a -b show that * is a binary operation of Z.

If A={a,b,c} , then the number of binary operations on A is

Define binary operation on a set. Verify whether the operation * is defined on Q set of rational number by a *b=ab+1, AA a,b in Q is binary or not.

Let * be defined on the set on A = {1,2,3,4,5} by a**b = HCF of a and b. Is *a binary operation on A.

On the set Z , of all integers ** is defined by a^(**)b=a+b-5 . If 2^(**)(x^(**)3)=5 then x=

OSWAAL PUBLICATION-II PUC JULY -2016 -PART-E (V. Answer any ten questions : )

An operation * on z^(+) ( the set of all non-negative integers) is def...
Text Solution
|
Prove that int(0)^(a) f(x) dx = int(0)^(a) f(a - x)dx and hence evalua...
Text Solution
|
For what value of 'k' the function {{:(kx^2",",x le 2),(3",",x>2):}...
Text Solution
|
Prove that: |[a-b-c, 2a,2a],[2b,b-c-a,2b],[2c,2c,c-a-b]|=(a+b+c)^3
Text Solution
|