SOLUTION: According it Descartes' Rule of Signs, (a) how many positive real roots does each of the following have? (b) how many negative roots? i have no idea how to do this im trying to lea
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-> SOLUTION: According it Descartes' Rule of Signs, (a) how many positive real roots does each of the following have? (b) how many negative roots? i have no idea how to do this im trying to lea
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: According it Descartes' Rule of Signs, (a) how many positive real roots does each of the following have? (b) how many negative roots? i have no idea how to do this im trying to learn this stuff on my own and its hard please help
f (a) = a^5 - 4a^2 - 7 (a)__________ (b)_________
This question is from textbook
First lets find the number of possible positive real roots:
For , simply count the sign changes
Here is the list of sign changes:
to (positive to negative)
(note: the rest of the terms have the same sign, so no extra sign changes occur)
So there is 1 sign change, this means there is a maximum of 1 positive root
So there is exactly one positive root
Now lets find the number of possible negative real roots
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First we need to find :
Plug in -a (just replace every "a" with "-a")
Simplify (note: if the exponent of the given term is odd, simply negate the sign of the term. If the term has an even exponent, then the sign of the term stays the same)
So
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Now lets count the sign changes for :
By looking at we can see that there are no sign changes (all the terms are negative).
So there are no negative roots
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