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polynomials (1 Viewer)
- Thread starter shkspeare
- Start date
first
P(x) = (x-a)(x-b)Q(x) + (cx+d) for some cx+d
then:
P(a) = a^2
P(b)= b^2
by the remainder theorem.
so if you
ca+d=a^2
cb +d = b^2
subtract the bottom equation from the one above
c(a-b) = a^2 - b^2
c= a+b
solve for d by substituting in ca + d = a^2
a^2 + ab + d = a^2
d = - ab
the remainder is
cx+d = (a+b)x -ab
second question: don't think so
P(x) = (x-a)(x-b)Q(x) + (cx+d) for some cx+d
then:
P(a) = a^2
P(b)= b^2
by the remainder theorem.
so if you
ca+d=a^2
cb +d = b^2
subtract the bottom equation from the one above
c(a-b) = a^2 - b^2
c= a+b
solve for d by substituting in ca + d = a^2
a^2 + ab + d = a^2
d = - ab
the remainder is
cx+d = (a+b)x -ab
second question: don't think so
KeypadSDM
B4nn3d
For both odd and even:
f(a) = 0
Even:
f(a) = f(-a)
f(-a) = 0
Odd:
f(a) = -f(-a)
-f(-a) = 0
f(-a) = 0
f(a) = 0
Even:
f(a) = f(-a)
f(-a) = 0
Odd:
f(a) = -f(-a)
-f(-a) = 0
f(-a) = 0