Question Factor the expression (g−1)(g4+g3+g2+g+1) Evaluate g5−1Calculate g5+g4+g3+g2+g−g4−g3−g2−g−1Rewrite the expression g×g4+g×g3+g×g2+g×g+g−g4−g3−g2−g−1Factor out g from the expression g(g4+g3+g2+g+1)−g4−g3−g2−g−1Factor out −1 from the expression g(g4+g3+g2+g+1)−(g4+g3+g2+g+1)Solution (g−1)(g4+g3+g2+g+1) Show Solution Find the roots g=1 Evaluate g5−1To find the roots of the expression,set the expression equal to 0 g5−1=0Move the constant to the right-hand side and change its sign g5=0+1Removing 0 doesn't change the value,so remove it from the expression g5=1Take the 5-th root on both sides of the equation 5g5=51Calculate g=51Solution g=1 Show Solution
Algebra
Calculus
Trigonometry
Matrix Algebra Calculus Trigonometry Matrix