Determine whether the rational root theorem provides a complete list of all roots for the following polynomial functions.
f(x) = 4x^2 − 25
A. No, this polynomial has complex roots
B. No, this polynomial has irrational roots
C. No, this polynomial has irrational and complex roots
D.Yes.
g(x) = 4x^2 + 25
A. No, this polynomial has complex roots
B. No, this polynomial has irrational roots
C. No, this polynomial has irrational and complex roots
D.Yes.
h(x) = 3x^2 − 25
A. No, this polynomial has complex roots
B. No, this polynomial has irrational roots
C. No, this polynomial has irrational and complex roots
D.Yes.
1) f(x) = 4x^2 − 25 f(x) = 4x^2 − 25 =0 implies 4x²=25, and x²=25/4, so the possible roots are x=sqrt(25/4= 5/2 or x= -sqrt(25/4)= -5/2 so the answer is D.Yes.
2) g(x) = 4x^2 + 25=0 implies 4x²= -25 and since i²= -1 (complex number) we can write 4x²= -25= 25i² so the possible root is x= sqrt(25i²/4)=5i/2 or x= -sqrt(25i²/4)=-5i/2 the answer is A. No, this polynomial has complex roots 3) h(x) = 3x^2 − 25=0 implies 3x²=25, x²=25/3 so the possible roots are x= -sqrt(25/3)= -5/sqrt3 or x=sqrt(25/3)=5/sqrt3 the answer is B. No, this polynomial has irrational roots
