Find the last two digits of 1232563. Show your work.
6.) Find (i) 225 mod 21, (ii) 766 mod 120 and (iii) the last two digits of 1 + 7162 + 5121. 3.12. 6. Find + (iii) the last two digits of 1 + 7162 +5121.3.12 (i) 225 mod 21, (ii) 766 mod 120 Answ ven 6. (i) 225 = 2 mod 21; (ii) 766 = 72 = 49 mod 1 20. (iii) °(100) = 40. So the last two digits of 7162 are 49. Note that, since (5, 100)...
Find (i) 2^25 mod 21, (ii) 7^66 mod 120 and (iii) the last two digits of 1 + 7^162 + 5^121 * 3^312
Programming language is C++. 9. Write a program that reads digits and composes them into integers. For example, 123 is read as the characters 1, 2, and 3. The program should output 123 is 1 hundred and 2 tens and 3 ones. The number should be output as an int value Handle numbers with one, two, three, or four digits. Hint: To get the integer value 5 from the character '5' subtract '0' that is, '5'-'0'
Find the last two digits of . How do I know phi(100) = 2^2 * 5^2 *(1- 1/2)* (1-1/5) ???? This appears and feels it has been done out of thin air. Then, Fermitas ?!?
will is playing a math game. He needs help to use the following clues to write a 5 digit number: 1.The number consists of 3 different digits 2.All digits are even numbers greater than zero 3.the value of the ones digit is one tenth of the value in the tens digit 4.The value of the tenths digit is 10 times as much as the value of the hundreds digit 5.The sum of the tenths and hundredths digits is equal to...
a = 5 , b = 8 Let a and b the last two digits of your QUID. Let f a differentiable function that satisfies the equation tºf(tx,ty)= tf(x,y), for t > 0 Show that f satisfies the following partial differential equation and find the value of k af =kf ax X +y af - ду
I am a 3-digit number divisible by three my tens digit is three times as great as my hundreds digit and the sum of my digits is 15 if you reverse my digits i am divisible by 6 as well as by three
The last three digits of my student id is 183 3) (30 pts) In this problem, the last two digits of your student number will be significant. Let N, be a number equal to the last digit of your student number, N, be a number equal to the last two digits of your student number. That is, if the last three digits of your student number is 83 then, N, = 3, N2 = 83. Consider a function f(x)=cos (11...
Compute the last two digits to the right of (probably have to use modular arithmetic)