Find the remainder when P(x) = 2x^3 + (-3)x + (6) is divided by x – (-1).
Topic: Algebra
Find the remainder when P(x) = 5x^3 + (1)x + (1) is divided by x – (4).
If α and β are roots of x^2 – (-7)x + (-60) = 0, find α^2 + β^2.
If α and β are roots of x^2 – (20)x + (99) = 0, find α^2 + β^2.
If α and β are roots of x^2 – (0)x + (-64) = 0, find α^2 + β^2.
If α and β are roots of x^2 – (-9)x + (-10) = 0, find α^2 + β^2.
If α and β are roots of x^2 – (17)x + (52) = 0, find α^2 + β^2.
If α and β are roots of x^2 – (10)x + (-24) = 0, find α^2 + β^2.
If α and β are roots of x^2 – (-8)x + (-33) = 0, find α^2 + β^2.
If α and β are roots of x^2 – (-2)x + (-63) = 0, find α^2 + β^2.
If α and β are roots of x^2 – (-12)x + (36) = 0, find α^2 + β^2.
If α and β are roots of x^2 – (7)x + (-30) = 0, find α^2 + β^2.
If α and β are roots of x^2 – (-7)x + (-8) = 0, find α^2 + β^2.
If α and β are roots of x^2 – (5)x + (-36) = 0, find α^2 + β^2.
If α and β are roots of x^2 – (4)x + (-12) = 0, find α^2 + β^2.
If α and β are roots of x^2 – (10)x + (25) = 0, find α^2 + β^2.
If α and β are roots of x^2 – (-5)x + (-14) = 0, find α^2 + β^2.
If α and β are roots of x^2 – (11)x + (24) = 0, find α^2 + β^2.
If α and β are roots of x^2 – (-2)x + (-24) = 0, find α^2 + β^2.
If α and β are roots of x^2 – (-6)x + (5) = 0, find α^2 + β^2.
If α and β are roots of x^2 – (11)x + (18) = 0, find α^2 + β^2.
If α and β are roots of x^2 – (4)x + (-21) = 0, find α^2 + β^2.