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Sum and Product of Roots (1 Viewer)
- Thread starter Iguana
- Start date
gurmies
Drover
Alright, your question is kind of ambiguous, but I do understand what you are getting at.
(1) When roots are reciprocals, and especially when you are dealing with an equation of order 2 (quadratic), the product of the roots:
a x 1/a (where "a" is a root) will always be = 1. This makes more difficult polynomial questions much simpler.
(2) When roots are equal in magnitude, but opposite in sign is a more complicated way of saying, if one root is a, the other is - a. Where does this become an advantage to us? Suppose you take the sum of roots:
a + (-a) will always = 0. [provided of course you are dealing with a quadratic equation]
(3) If one root is equal to zero, and you take the sum of roots:
a + 0 = -b/a. It then becomes quite easy to find the other root.
Once again, i'm not too sure what exactly you were asking about. If you post specific questions, I can show you how to apply this knowledge!
(1) When roots are reciprocals, and especially when you are dealing with an equation of order 2 (quadratic), the product of the roots:
a x 1/a (where "a" is a root) will always be = 1. This makes more difficult polynomial questions much simpler.
(2) When roots are equal in magnitude, but opposite in sign is a more complicated way of saying, if one root is a, the other is - a. Where does this become an advantage to us? Suppose you take the sum of roots:
a + (-a) will always = 0. [provided of course you are dealing with a quadratic equation]
(3) If one root is equal to zero, and you take the sum of roots:
a + 0 = -b/a. It then becomes quite easy to find the other root.
Once again, i'm not too sure what exactly you were asking about. If you post specific questions, I can show you how to apply this knowledge!
