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$$\frac\sqrt[3]x^12 \cdot y^-6 \cdot \sqrtx^4 y^2(x^2 y^-1)^3$$
Find the remainder when $x^100 + 2x^50 + 1$ is divided by $x^2 - 1$. me las vas a pagar mary rojas pdf %C3%A1lgebra
Copy the 10 exercises above onto a Word document, solve them by hand, and save it as "Mary_Rojas_Algebra_Guide.pdf" on your computer. Congratulations—you just created the PDF you were looking for. Let Mary = $M$, Rojas = $R$
Let Mary = $M$, Rojas = $R$. $M = 3R$. $M + 10 = 2(R + 10) \rightarrow 3R + 10 = 2R + 20 \rightarrow R = 10$. Thus $M = 30$. 8. Absolute Value Equations (The Double Case) $$|x-3| + |x+2| = 7$$ Thus $M = 30$
When dividing by $x^2 - 1$, the remainder is of the form $ax + b$. We know $x^2 = 1$, so $x^100 = (x^2)^50 = 1^50 = 1$. And $x^50 = (x^2)^25 = 1$. Thus $P(x) \equiv 1 + 2(1) + 1 = 4$. Since the remainder is a constant, $ax+b = 4$. Answer: $4$ (remainder is $0\cdot x + 4$). 7. Age Problems (Verbal Algebra) Classic word problem: