![]() Thankfully, you can convert an iterative formula to an explicit formula for arithmetic sequences. In the explicit formula "d(n-1)" means "the common difference times (n-1), where n is the integer ID of term's location in the sequence." In the iterative formula, "a(n-1)" means "the value of the (n-1)th term in the sequence", this is not "a times (n-1)." Even though they both find the same thing, they each work differently-they're NOT the same form. A + B(n-1) is the standard form because it gives us two useful pieces of information without needing to manipulate the formula (the starting term A, and the common difference B).Īn explicit formula isn't another name for an iterative formula. M + Bn and A + B(n-1) are both equivalent explicit formulas for arithmetic sequences. So the equation becomes y=1x^2+0x+1, or y=x^2+1ītw you can check (4,17) to make sure it's right Substitute a and b into 2=a+b+c: 2=1+0+c, c=1 Then subtract the 2 equations just produced: Solve this using any method, but i'll use elimination: The function is y=ax^2+bx+c, so plug in each point to solve for a, b, and c. Let x=the position of the term in the sequence Since the sequence is quadratic, you only need 3 terms. Lastly, subtract 12 from 21, to get -9, which is the correct answer. Then, in the parenthesis, you will have 4-1, which is 3. So for n4, first use the equation f (n) 12 - 7 (n - 1), plug in 4 for n. ![]() that means the sequence is quadratic/power of 2. Just use Order of Operations, and you will get the right answer for every term. However, you might notice that the differences of the differences between the numbers are equal (5-3=2, 7-5=2). This isn't an arithmetic ("linear") sequence because the differences between the numbers are different (5-2=3, 10-5=5, 17-10=7) Calculation for the n th n^\text=17 = 5 + 4 ⋅ 3 = 1 7 equals, start color #0d923f, 5, end color #0d923f, plus, 4, dot, start color #ed5fa6, 3, end color #ed5fa6, equals, 17
0 Comments
Leave a Reply. |
AuthorWrite something about yourself. No need to be fancy, just an overview. ArchivesCategories |