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What is the remainder when 2 90 is divided 101?
Originally Answered: What will the remainder be when 2^100 is divided by 101? 30 is the remainder.
How do you find the remainder when a number is divided by 100?
When a number is divided by 100, the quotient is the number made by the digits, except the digits at one’s and ten’s places. The number formed by ten’s and one’s digit of the dividend number is the remainder. The number of digits in the remainder is equal to the number of zeros in the divisor. (vii) Divide 396 by 100.
What is the remainder when 2100 2 divided by 101?
Hence, 2^100 will give a remainder of 1 when divided by 101.
What is the remainder when 7 to the Power 700 divided by 100?
1
1 is the remainder when 7^700 is divided by 100.
How do you solve 100 divided by 3?
The division 1÷3 is now 1÷10 which is equal to 0.1. so you see writing (in base ten) 100÷3=33.333333 does not mean that we cannot divide 100 into three equal parts.
What is the remainder of 2^100/1000 = 2^3A + 5^3b?
So 2^100 = 1 mod 5^3. So the remainder of 2^100/1000 is the value which is 0 mod 2^3 and 1 mod 5^3. That is, it is the value of both sides of the equation 2^3 a = 1 + 5^3 b. Quora is full of questions like this, and I don’t quite know why. But anyway, we can be clever about this:
How do you find the remainder when dividing by 10?
First, if a number is being divided by 10, then the remainder is just the last digit of that number. Similarly, if a number is being divided by 9, add each of the digits to each other until you are left with one number (e.g., 1164 becomes 12 which in turn becomes 3), which is the remainder.
What is the remainder of 2^(odd no) divided by (power+1)?
Here we see that if 2^ (ODD NO.) divided by (power+1) it gives remainder 0, but 2^ (EVEN NO. ) divided by (power+1) it gives remainder 1. In question power of 2 is EVEN .so 2nd condition will be follow.
What is the remainder when 821 is divided by 4?
There are 3 ways of writing a remainder: with an R, as a fraction, and as a decimal. For example, 821 divided by 4 would be written as 205 R 1 in the first case, 205 1 / 4 in the second, and 205.25 in the third. What is the remainder when 26 is divided by 6?