6 = 3 × 2
The Factor Theorem:
Let f(x) be a polynomial. Then (x-k) is a factor of f(x) if and only if f(k) = 0.
4x3 - (3p + 2)x2 - (p2 - 1)x + 3.
Let f(x) = 4x3 - (3p + 2)x2 - (p2 - 1)x + 3.
x - p is a factor of f(x) only if
f(p) = 0
4p3 - (3p + 2)p2 - (p2 - 1)p + 3 = 0
2p2 - p - 3 = 0
(p + 1) (2p - 3) = 0
p = -1 or p = 3/2
6÷2 => remainder = 0
6÷3 => remainder = 0
α‘αΎαြα္း 0 αေα‘ာα္α ားႏိုα္ေαာ α ားαိα္းαို αα္αိα္း၏ factor αုေαααα္။
The Factor Theorem:
Let f(x) be a polynomial. Then (x-k) is a factor of f(x) if and only if f(k) = 0.
Example 1
4x3 - (3p + 2)x2 - (p2 - 1)x + 3.
Let f(x) = 4x3 - (3p + 2)x2 - (p2 - 1)x + 3.
x - p is a factor of f(x) only if
f(p) = 0
4p3 - (3p + 2)p2 - (p2 - 1)p + 3 = 0
2p2 - p - 3 = 0
(p + 1) (2p - 3) = 0
p = -1 or p = 3/2
α
ာαα်αူ၏ α‘αြα်αို αေးα
ားα
ွာα
ောα့်αျှော်αျα်!
αα္αါα₯ီးαα္။
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