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He is a Professor and world-known Environmentalist. He is Quality, Environment, Human Resources Expert. He is highly qualified with 29 degrees from 21 Universities, Limca Record 2008.
He is Crusador of Paryavaran Kavitodyamam (Environment Poetry Movement). He is Director of jagruthi Kiran Consultants (Industrial, Management, HRD Consultants), Founder Secretary of Jagruthi Kiran Foundation, Secretary General of International Benevolent Research Forum.
He Kentuckey Colonnel designated by Governor of Kentucky (USA) for his lifetime achievements. He received many awards, honours from world over.
What else can I help you with?
How do you translate Patricia into Apache?
n n n n n n n n.
What must you multiply n squared to get n cubed?
n squared x n n x n x n = n cubed n x n = n squared n squared x n = n cubed
What is the value of n(n-1)(n-2)(n-3)(n-4)(n-5) in a given mathematical expression or equation?
The value of the expression n(n-1)(n-2)(n-3)(n-4)(n-5) is the product of n, n-1, n-2, n-3, n-4, and n-5.
What is the number minus the product of 5 and the number?
N - 5*N = 4*N N - 5*N = 4*N N - 5*N = 4*N N - 5*N = 4*N
How do you do n squared plus n?
(n*n)+n
How long was all that jazz on Broadway for?
jazz has been around for a billion years
What country name with 8 letters?
Barbados \n . Botswana \n . Bulgaria \n . Cameroon \n . Colombia \n . Ethopia \n . Hondurus \n . Kiribati \n . Malaysia \n . Mongolia \n . Pakistan \n . Paraguay \n . Portugal \n . Slovakia \n .
What makes a Proscope a good investment for the Police Department?
n ,n ,n,n,,n ,,n,n
What is the sum of the first n numbers?
Assuming you mean the first n counting numbers then: let S{n} be the sum; then: S{n} = 1 + 2 + ... + (n-1) + n As addition is commutative, the sum can be reversed to give: S{n} = n + (n-1) + ... + 2 + 1 Now add the two versions together (term by term), giving: S{n} + S{n} = (1 + n) + (2 + (n-1)) + ... + ((n-1) + 2) + (n + 1) → 2S{n} = (n+1) + (n+1) + ... + (n+1) + (n+1) As there were originally n terms, this is (n+1) added n times, giving: 2S{n} = n(n+1) → S{n} = ½n(n+1) The sum of the first n counting numbers is ½n(n+1).
What is the hardest math question ever?
n+n-n-n-n+n-n-n squared to the 934892547857284579275348975297384579th power times 567896578239657824623786587346378 minus 36757544.545278789789375894789572356757583775389=n solve for n! the answer is 42
What is the sum of n, n-1, n-2, and n-3?
The sum of n, n-1, n-2, and n-3 is 4n-6.
How do you become a fan club member on ticketmaster?
n nn n n n n n
