Question
a.
Odd number
b.
Even number
c.
Prime number
d.
None of the mentioned
Posted under Discrete Mathematics
Engage with the Community - Add Your Comment
Confused About the Answer? Ask for Details Here.
Know the Explanation? Add it Here.
Q. If a, b, c, d are distinct prime numbers with an as smallest prime then a * b * c * d is a ___________
Similar Questions
Discover Related MCQs
Q. If a, b are two distinct prime number than a highest common factor of a, b is ___________
View solution
Q. If there exist an integer x such that x² ≡ q (mod n). then q is called ______________
View solution
Q. If there exist no integer x such that x² ≡ q (mod n). then q is called __________
View solution
Q. The Fermat’s little theorem for odd prime p and coprime number a is?
View solution
Q. 5 is quardratic non-residue of 7.
View solution
Q. 4 is quardratic residue of 7.
View solution
Q. 8 is quardratic residue of 17.
View solution
Q. 8 is quardratic residue of 11.
View solution
Q. Which of the following is a quardratic residue of 11?
View solution
Q. What is pseudo prime number?
View solution
Q. Pseudo prime are classified based on property which they satisfy, which of the following are classes of pseudoprimes?
View solution
Q. A Least Common Multiple of a, b is defined as __________
View solution
Q. The LCM of two number 1, b(integer) are _________
View solution
Q. If a, b are integers such that a > b then lcm(a, b) lies in _________
View solution
Q. LCM of 6, 10 is?
View solution
Q. The product of two numbers are 12 and their Greatest common divisor is 2 then LCM is?
View solution
Q. If LCM of two number is 14 and GCD is 1 then the product of two numbers is?
View solution
Q. If a number is 2² x 3¹ x 5⁰ and b is 2¹ x 3¹ x 5¹ then lcm of a, b is?
View solution
Q. State whether the given statement is True or False.
LCM (a, b, c, d) = LCM(a,(LCM(b,(LCM(c, d)))).
View solution
Q. LCM(a, b) is equals to _________
View solution
Suggested Topics
Are you eager to expand your knowledge beyond Discrete Mathematics? We've curated a selection of related categories that you might find intriguing.
Click on the categories below to discover a wealth of MCQs and enrich your understanding of Computer Science. Happy exploring!