Is there a simple algorithm for 1.21 × 32 - [5.14 + 7 / 50] and how to calculate it?

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• 1. If the sum of three times of a prime number and two times of another prime number is 100, what are the two prime numbers
• 2. Given two straight lines L1: MX + 8y + n = 0 and L2: 2x + MY-1 = 0, find the value of M, N, satisfying the following conditions. (1) L1 and L2 intersect at point (m, - 1) (2) L1 is parallel to L2
• 3. Calculation: 321 × 654 ﹣ 987 ﹣ 654 × 987 ﹣ 321=______ ．
• 4. It is proved that if P is prime, then the ratio of root P is irrational
• 5. Given two straight lines L1: MX + 8y + n = 0 and L2: 2x + MY-1 = 0, if L1 / / L2, find the value of M, n,
• 6. (987*655-321)/(666+987*654)
• 7. It is proved that 3 is irrational
• 8. Given two straight lines L1: MX + 8y + n = 0 and L2: 2x + MY-1 = 0, try to determine the value of M and N, so that 1: L1 intersects L2 at point P (m, 1)
• 9. How much is 987 * 655-321 of 666 + 987 * 654
• 10. Let p be a positive prime and prove that the root P is irrational
• 11. Given two straight lines L1: MX + 8y + n = 0 and l: 2x + MY-1 = 0, try to determine the value of M, n 1: L1 and L2 intersect at point (m, - 1) 2: L1 is parallel L2 3: L1 is vertical L2, and the intercept of L1 on Y axis is - 1
• 12. Calculate and output the sum of the square roots of all prime numbers from 3 to N, n > 2, different > 100
• 13. Simple calculation of 21 / 5 * 1 / 31 + 4 / 5 * 21 / 31
• 14. The set of points equidistant from a pair of parallel lines 5x-2x-6 = 0, 10x-4y + 3 = 0 is
• 15. Calculate and output the square root of the sum of all prime numbers from 3 to 100 (including 3 and 100)
• 16. 2.1×1.1×0.54÷（5.4×1.21÷521）=______ ．
• 17. Let C: x ^ 2 + y ^ 2 + 4x-6y = 0, if C is symmetric with respect to the line L: a * (x-2y) - (2-A) * (2x + 3y-4) = 0, find the value of real number a
• 18. How to use C + + program to judge whether a number is prime or not
• 19. 2.1×1.1×0.54÷（5.4×1.21÷521）=______ ．
• 20. It is known that two straight lines L1: ax by + 4 = 0, L2: (A-1) x + y + B = 0. The line L1 is parallel to L2, and the distance from the origin of the coordinate to L1 and L2 is equal. The value of a and B can be obtained