How to add 1 to 100?
1³+2³+…… +100³
=(1+2+…… +100)²
=5050²
=25502500
RELATED INFORMATIONS
- 1. The zero power of 3 plus the first power of 3 plus the second power of 3 plus the third power of 3 is always added to the hundred power of 3
- 2. What is the 16th power of 25 multiplied by the 38th power of 2
- 3. How many times the power of 25 times the power of 2 of 5 is 625?
- 4. What is the power of - 2 of 0.25 + 2 / 3 of 8 - 1 / 16 - 0.75
- 5. What is the - 4 / 3 power of 16? Tell me how to calculate it
- 6. Design a graph, find the value of 1 + 3 + 5 + 7 + 9 +. + (2n-1), a is a positive integer, and use the graph to make the necessary explanation
- 7. Let a = {x x is a positive integer less than 9}, B = {1,2,3}, C = {3,4,5,6}, then: 1, a intersection B = 2, a intersection C= 3. A-join (b-join C) = 4, a-join (b-join C)=
- 8. If a and B are positive integers, and 5A + 3B = 70, then the values of a and B satisfying the formula have () pairs. A.2. B.3. C.4. D.5
- 9. The values of integers a, B, C satisfying (8 / 25) ^ (- a) * (9 / 2) ^ (- b) * (5 / 3) ^ (- C) = 18
- 10. Given that a, B, C and D are mutually unequal integers, and ABCD = 9, then the value of a + B + C + D is equal to () A. 0b. 4C. 8D
- 11. 0 to the power of 0 is 1 or 0
- 12. a. B.C. are all prime numbers. A plus B equals 33. B plus C equals 34. C plus D equals 66. So what's D
- 13. a. B, C are three different prime numbers, and a B = 33, B C = 34, c d = 66, find a
- 14. a. B, C are prime numbers, and a + B = 33, B + C = 44, C + D = 66, then CD=______ .
- 15. a. If B and C are prime numbers and satisfy a + B + C + ABC = 99, then | 1a − 1b | + | 1b − 1c | + | 1c − 1a|=______ .
- 16. a. B. C is three prime numbers within 100. How many satisfy a + B = C
- 17. The sum of the three primes is 38. What is the maximum value of the product of the three primes?
- 18. ABC is three prime numbers and the product of ABC is five times of the sum of ABC. How much is the sum of a ^ 2 + B ^ 2 + C ^ 2 abc=5(a+b+c) Because a, B, C are all prime numbers, so one of a, B, C is 5, and because the band formula is rotational symmetry, any change of the order of a, B, C does not affect the result Let a = 5 To 5BC = 25 + 5B + 5C Divide both sides by 5 bc=5+b+c bc-b-c+1=6 (b-1)(c-1)=6=1*6=2*3 If it is decomposed into 2 * 3, then B and C are 3 and 4 respectively So (B-1) (C-1) = 1 * 6 Let B-1 = 1 and C-1 = 6 So B = 2, C = 7 a^2+b^2+c^2=5^2+2^2+7^2=78 Why does ABC have a number of 5
- 19. a. If a + B + C = 162 and a * B + A * C + b * C = 6279, then a * b * C +?
- 20. There are three prime numbers a, B and C, a + B = 20, B + C = 30, a × B × C =? The results I know: 7, 13, 17, the best equation