Question

Find the Unit digits of (34563^20359)+(2358^784)

Answer 1

when you slv . this by simply multiplication and added sign then , 705516789 ( in unit place we see * 9* is the unit place .
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Answer 2

Answer:

The unit digit of the equation " (34563²⁰³⁵⁹) + (2358⁷⁸⁴) " is 3

Step-by-step explanation:

Hey Mate,

For finding the unit digit of this equation, we just need to take unit digit of each  number.

Unit Digit : The units digit is the digit in the one's column of the number.  For Example 123, 1 is in the hundreds column, the 2 is in the tens column and the 3 is in the one's column. So, the Unit digit of the number 123 is "3" .

Equation : ( 34563²⁰³⁵⁹ ) + ( 2358⁷⁸⁴ )

=> 3²⁰³⁵⁹ + 8⁷⁸⁴

=> 3⁵⁹ + 8⁸⁴             (Take last two digits of the power's)

=> 3³ + 8⁴  (When we Divide 59 and 84 by 4, so we get Remainder 3 and 0)

=> 27 + 4096   ( Unit Digits )

=> 7 + 6

=> 13.

So,

The unit digit of the equation "( 34563²⁰³⁵⁹ ) + ( 2358⁷⁸⁴ )" is 3