412 = (40 + 1)2 = 402 + 2*40*1 + 12 = 1600 + 80 + 1 = 1681
Given the algebraic expression (3m - 2)2, use the square of a difference formula to determine the middle term of its product.
For me, it is equal to the square of the first terms minus the square of the second terms...:-)For example . . .(9x + 5) (9x - 5)= (9x)2 - (5)2= 81x2 - 25The former answer was this:"it is equal to the square of the first term minus the square of the second term"If we answer in that way, the solution is this:(9x + 5) - (9x -5)= (9x + 5)2 - (9x - 5)2= (81x2 + 25) - (81x2 + 25)= 81x2 + 25 - 81X2 - 25= 0Let us use the DCMC or Dalope's Coefficient Method of Checking: (Checking the answer using only the coefficients)= (9 + 5) - (9 - 5)= (14) - (4)= 10Our answer to the problem (9x + 5) (9x - 5) using the "it is equal to the square of the first term minus the square of the second term" is 0 but the DCMC answer is 10. There is conflict with the answer!But if we answer in this way: "it is equal to the square of the first terms minus the square of the second terms" the answer would be 81x2 - 25 and it's answer in DCMC is 56. Let me prove it:(9 + 5) (9 - 5) (9 + 5) ( 9 - 5)= (14) (4) or = 81(9 x 9) - 25(5 x -5)= 56 = 56Conclusion: The only mistake in the former answer (it is equal to the square of the first term minus the square of the second term) is HIS SOLUTION TO HIS GIVEN EXAMPLE IS CORRECT BUT HIS ANSWER TO THE QUESTION "The product of the sum and difference of the same two terms is equal to what?" IS WRONG OR HE MISSED ONLY TO MAKE THE WORD "TERM" PLURAL!:-) I hope that my answer will correct your understanding about the above question guys!!!Jilverex Rainrex_rain@rocketmail.com
No, it is not.
A binomial is a mathematical term for a polynomial with two terms.
this term 2x is not a polynomial. this term is a monomial. since only one term was listed it can not be a polynomial. A polynomial is like four or more terms. a trinomial is three terms and a binomial is two terms.
Given the algebraic expression (3m - 2)2, use the square of a difference formula to determine the middle term of its product.
Yes. For example, the conjugate of (square root of 2 + square root of 3) is (square root of 2 - square root of 3).
Square
For me, it is equal to the square of the first terms minus the square of the second terms...:-)For example . . .(9x + 5) (9x - 5)= (9x)2 - (5)2= 81x2 - 25The former answer was this:"it is equal to the square of the first term minus the square of the second term"If we answer in that way, the solution is this:(9x + 5) - (9x -5)= (9x + 5)2 - (9x - 5)2= (81x2 + 25) - (81x2 + 25)= 81x2 + 25 - 81X2 - 25= 0Let us use the DCMC or Dalope's Coefficient Method of Checking: (Checking the answer using only the coefficients)= (9 + 5) - (9 - 5)= (14) - (4)= 10Our answer to the problem (9x + 5) (9x - 5) using the "it is equal to the square of the first term minus the square of the second term" is 0 but the DCMC answer is 10. There is conflict with the answer!But if we answer in this way: "it is equal to the square of the first terms minus the square of the second terms" the answer would be 81x2 - 25 and it's answer in DCMC is 56. Let me prove it:(9 + 5) (9 - 5) (9 + 5) ( 9 - 5)= (14) (4) or = 81(9 x 9) - 25(5 x -5)= 56 = 56Conclusion: The only mistake in the former answer (it is equal to the square of the first term minus the square of the second term) is HIS SOLUTION TO HIS GIVEN EXAMPLE IS CORRECT BUT HIS ANSWER TO THE QUESTION "The product of the sum and difference of the same two terms is equal to what?" IS WRONG OR HE MISSED ONLY TO MAKE THE WORD "TERM" PLURAL!:-) I hope that my answer will correct your understanding about the above question guys!!!Jilverex Rainrex_rain@rocketmail.com
Four years with a two consecutive term limit.
cbse schools have two terms- term one from april to septamber term two from september to march
One term as President is four years, with a limit of two terms.
Two terms only, terms are four years each.
Grover Cleveland
No, it is not.
No, the term limit for a president is two terms.
A binomial is an algebraic expression consisting of two terms separated by + or -.