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The product of a Λ N and B Λ 2 is 3a Λ 2n + 1, B Λ 2n + 1
The monomial of 3A Λ 2n + 1 B Λ 2n + 1 is 3a Λ n + 1 B Λ 2N-1
RELATED INFORMATIONS
- 1. If − 12a2b2n − 1 is a quintic monomial, then the value of n is______ .
- 2. The sum of two monomials 2A ^ 5 ^ 2M and 4A ^ NB ^ 6 is still a monomial, m ^ 2-N ^ 2 = ()
- 3. -The sum of 2A ^ (M + 2) B and 3a ^ (2n + 1) is a monomial. What is (M + n) ^ 2011
- 4. -A ^ MB ^ 2 is similar to 2Ab ^ n, M + n =?
- 5. Given that M is the solution of quadratic equation x2-9x + 1 = 0, then m2-7m + M2 + 1 / 18=
- 6. Given the square of M - 7m + 2 = 0, the square of Nd - 7n + 2 = 0, find n / M + m / N =?
- 7. If the line y = 4x + 3m-1 intersects with the line y = x-m-4, and the intersection point is in the third quadrant, then the value range of M is the same
- 8. If f (x) = (m ^ 2-1) x + m ^ 2-3m + 2, if f (x) is a decreasing function, and f (x) = 0, if f (x) ≥ x ^ 2, find the value range of X
- 9. We know that the first-order function y = (3m-6) x + m + 1, when m____ The image does not pass through the first quadrant
- 10. If the intersection of the line y = 2X-4 and the line y = 4x + B is in the third quadrant, the value range of B is obtained,
- 11. If the monomial a ^ 4 B ^ 2N-1 is the same as - 2 / 3A ^ 4 B ^ n + 7, then the value of n is?
- 12. It is known that the sum of the monomial 3amb2 and − 23a4bn-1 is a monomial, then - M + n=______ .
- 13. It is known that the sum of the monomial 7amb2 and - 13a4bn-1 is a monomial, then M=______ ,n=______ .
- 14. If the difference between 3A ^ 3B ^ n and 5A ^ MB ^ 4 is monomial, M = then n= If the polynomial 9x ^ 3 + 4x-2 and x ^ n-1 are the same polynomial, then n= If a polynomial plus - 2 + x-x ^ 2 yields x ^ 2-1, then the polynomial is
- 15. If the degree of monomial - 2 ^ 2XY is m and the number of terms of polynomial - AB ^ 3-2a ^ 2B + 3A ^ 3b is n, then - m ^ n=---------
- 16. (2a-3b)*(2b+3a) How much is it,
- 17. If M minus m minus 1 equals 0, n minus n minus 1 equals 0, then cubic m plus cubic n equals 0
- 18. Let P: for M belong to [negative one, 1], inequality a square minus 5A minus 3 is greater than or equal to m square plus 8, proposition q, inequality x square plus ax plus 2 Let P: for M belong to [negative one, 1], inequality a square minus 5A minus 3 is greater than or equal to the following sign m square plus 8. Proposition q, inequality x square plus ax plus 2 is less than 0. If P is true proposition and Q is false proposition, the value range of a should be explained in detail
- 19. When m is an integer, the value of fraction 6m + 3 / 2m-1 is also an integer
- 20. The solution of {x + y = m + 2; 4x + 5Y = 6m + 3} is an integer