Web25 apr. 2024 · `7^(103)` when divided by 25 leaves the remainder . askedJan 4, 2024in Binomial Theoremby DevikaKumari(70.2kpoints) class-11 binomial-theorem-and-its-applciations 0votes 1answer `2^60` when divided by 7 leaves the remainder askedJan 3, 2024in Binomial Theoremby DevikaKumari(70.2kpoints) class-11 binomial-theorem-and … WebStep 1: Enter the fraction you want to simplify. The Fraction Calculator will reduce a fraction to its simplest form. You can also add, subtract, multiply, and divide fractions, as well as, convert to a decimal and work with mixed numbers and reciprocals. We also offer step by step solutions. Step 2: Click the blue arrow to submit.
Find the remainder when \\(7^{103}\\) is divided by 25
WebAnswer (1 of 7): What's the remainder for 101*102*103*104*105/100? We have 101 = 1 mod(100) 102 = 2 mod(100) 103 = 3 mod(100) 104 = 4 mod(100) 105 = 5 mod(100) then we have 101 x 102 x 103 x 104 x 105 = ( 1 x 2 x 3 x 4 x 5) mod (100) 101 x 102 x 103 x 104 x 105 = ( 120) mod (100) 101 x ... WebExample: Find the remainder when 7 103 is divided by 25. Sol: (7 103 / 25) = [7(49) 51 / 25)] = [7(50 − 1) 51 / 25] = [7(25K − 1) / 25] = [(175K – 25 + 25−7) / 25] = [(25(7K − 1) + 18) / 25] ∴ The remainder = 18. Example: If the fractional part of the number (2 403 / 15) is (K/15), then find K. Sol: (2 403 / 15) = [2 3 (2 4) 100 / 15] ki sawyer weather
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Web20 mei 2024 · Hence, when 7103 is divided by 25, it leaves a remainder 18. Advertisement Advertisement New questions in Math. le 1: Multiply 33 x 15. If x=2+√3 and xy= 1 then … WebClick here to get an answer to your question Find the remainder when 7 ^103 is divided by 25. Do My Homework. Find the remainder when 7 ^103 is divided by 25. Formula used: When we divide some number by 100. N/100 = Remainder (last 2 digit of N). Calculation: 51 * 27 * 35 * 62 ... Web3 okt. 2024 · They form the cycle 7 − > 9 − > 3 − > 1. Thus, 7 n has the units digit of 3 if n has a remainder of 3 when it is divided by 4. The remainder when 103 is divided by 4 is 3, so the units digit of 7 103 is 3. Thus, the units digit of ( 3 101) ( 7 103) is 3 ∗ 3 = 9. Therefore, the answer is E. ki sawyer auction