Find value of a & b so that the polynomial x^3 -10x^2 +ax +b is exactly divisible by (x-1) as well as (x-2).
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Step-by-step explanation:
Answer:
Answer:Answer:-
Answer:Answer:-The value of a is 23 and b is (-14).
Answer:Answer:-The value of a is 23 and b is (-14).Step-by-step explanation:
Answer:Answer:-The value of a is 23 and b is (-14).Step-by-step explanation:Polynomial =
Answer:Answer:-The value of a is 23 and b is (-14).Step-by-step explanation:Polynomial ={{x}^{3} - 10 {x}^{2} + ax + b}x
Answer:Answer:-The value of a is 23 and b is (-14).Step-by-step explanation:Polynomial ={{x}^{3} - 10 {x}^{2} + ax + b}x 3
Answer:Answer:-The value of a is 23 and b is (-14).Step-by-step explanation:Polynomial ={{x}^{3} - 10 {x}^{2} + ax + b}x 3 −10x
Answer:Answer:-The value of a is 23 and b is (-14).Step-by-step explanation:Polynomial ={{x}^{3} - 10 {x}^{2} + ax + b}x 3 −10x 2
Answer:Answer:-The value of a is 23 and b is (-14).Step-by-step explanation:Polynomial ={{x}^{3} - 10 {x}^{2} + ax + b}x 3 −10x 2 +ax+b
Answer:Answer:-The value of a is 23 and b is (-14).Step-by-step explanation:Polynomial ={{x}^{3} - 10 {x}^{2} + ax + b}x 3 −10x 2 +ax+bValue of a and b = ?
Answer:Answer:-The value of a is 23 and b is (-14).Step-by-step explanation:Polynomial ={{x}^{3} - 10 {x}^{2} + ax + b}x 3 −10x 2 +ax+bValue of a and b = ?The polynomial is supposed to divisible by (x - 1) and (x - 2)
Answer:Answer:-The value of a is 23 and b is (-14).Step-by-step explanation:Polynomial ={{x}^{3} - 10 {x}^{2} + ax + b}x 3 −10x 2 +ax+bValue of a and b = ?The polynomial is supposed to divisible by (x - 1) and (x - 2)____________________________
Answer:Answer:-The value of a is 23 and b is (-14).Step-by-step explanation:Polynomial ={{x}^{3} - 10 {x}^{2} + ax + b}x 3 −10x 2 +ax+bValue of a and b = ?The polynomial is supposed to divisible by (x - 1) and (x - 2)____________________________Having divisor as (x - 1) :
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b = 32 - 2(23)⟶b=32−2(23)
b = 32 - 2(23)⟶b=32−2(23)b = 32 - 46⟶b=32−46
b = 32 - 2(23)⟶b=32−2(23)b = 32 - 46⟶b=32−46b = -14⟶b=−14
b = 32 - 2(23)⟶b=32−2(23)b = 32 - 46⟶b=32−46b = -14⟶b=−14Therefore, the value of a is 23 and b is (-14).
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