Determine the total number of roots of each polynomial function using the factores form? F(x) = (x-6)^2(x+2)^2
2 answers:
Answer:
total number of roots =4
Step-by-step explanation:
the total number of roots of each polynomial function using the factored form
Given f(x) is in factored form, to get the roots we look at the factors and the exponents.
has exponent 2, so we have two roots 6 and 6
like that gives us two roots because it has exponent 2
So total number of roots for this polynomial function is 4
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The value of d is -2
Step-by-step explanation:
The nth term of the arithmetic sequence is , where
is the first term
- d is the common difference between each 2 consecutive terms
The nth term of the geometric sequence is , where
- r is the common ratio between each two consecutive terms
∵ of an arithmetic sequence is 1
∵ The common difference is d, where d ≠ 0
∵ ,
,
are the first 3 terms of a geometric sequence
∵ = 1 + (2 - 1)d
∴ = 1 + d
∵ = 1 + (3 - 1)d
∴ = 1 + 2d
∵ = 1 + (6 - 1)d
∴ = 1 + 5d
∴ The first 3 terms of the geometric sequence are (1 + d) , (1 + 2d) ,
(1 + 5d)
∵ The common ratio in the geometric sequence is
∴
- Use cross multiplication with the equal fractions
∵
∴ (1 + 2d)(1 + 2d) = (1 + d)(1 + 5d)
∴ 1 + 2d + 2d + 4d² = 1 + 5d + d + 5d²
- Add like terms in each side
∴ 1 + 4d + 4d² = 1 + 6d + 5d²
- Subtract 1 from both sides
∴ 4d + 4d² = 6d + 5d²
- Subtract 4d from both sides
∴ 4d² = 2d + 5d²
- Subtract 4d² from each side
∴ 0 = 2d + d²
- Take d as a common factor
∴ 0 = d(2 + d)
- Equate each factor by 0
∴ d = 0 but we will reject it because d ≠ 0
∴ 2 + d = 0
- Subtract 2 from both sides
∴ d = -2
The value of d is -2
Learn more:
You can learn more about the sequence in brainly.com/question/1522572
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<span>Along the x axis:
5 - 3 = 2 blocks
</span>Along the y axis:
8 - 1 = 7 blocks
Total:
2 + 7 = 9 blocks
5 - 3 = 2 blocks
</span>Along the y axis:
8 - 1 = 7 blocks
Total:
2 + 7 = 9 blocks