If a polynomial () =
^4 − 6
^3 + 16
^2 −25 + 10 is divided by another polynomial
^2 −2 + , then the remainder comes
out to be ( + ). Find the values of and .
Answers
Answer:
since your question is incomplete my answer is silly
Step-by-step explanation:
ANSWER
f(x)= is divided by another polynomial
x
2
−2x+k)
x
4
−6x
3
+16x
2
−25x+10
(x
2
−4x+(8−k)
−
x
4
+
−2x
3
−
+
kx
2
−4x
3
+(16−k)x
2
−25x+10
−
−4x
3
−
+8x
2
+
−
4kx
(8−k)x
2
+(4k−25)x+10
−
(
8−k)x
2
+
−
(
2k−16)x
−
+
(8k−k
2
)
(2k−9)x+(k
2
−8k+10)
But remainder is given x+a
∴x+a=(2k−9)x+(k
2
−8k+10)
On equating coefficient, we get
2k−9=1⇒k=5
and a=k
2
−8k+10⇒a=25−40+10=−5
Hence, k=5,a=−5
Answer:
i cant understand your question sorry
Step-by-step explanation:
what is ment by:-
If a polynomial () =
^4 − 6
^3 + 16
^2 −25 + 10 is divided by another polynomial
^2 −2 + , then the remainder comes
out to be ( + ). Find the values of and .