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NO LINKS!! Use the method of substitution to solve the system. (If there's no solution, enter no solution). Part 9z​

NO LINKS!! Use the method of substitution to solve the system. (If there's no solution-example-1
User Daniel Ehrhardt
by
3.3k points

2 Answers

16 votes
16 votes

Answer:

  • (-3, 2)
  • (1, 0)

=====================

Given system

  • y² = 1 - x
  • x + 2y = 1

Rearrange the first equation

  • x = 1 - y²

Substitute the value of x into second equation

  • 1 - y² + 2y = 1
  • y² - 2y = 0
  • y(y - 2) = 0
  • y = 0 and y = 2

Find the value of x

  • y = 0x = 1 - 0² = 1
  • y = 2x = 1 - 2² = -3
User Soylent Graham
by
3.1k points
9 votes
9 votes

Answer:


(x,y)=\left(\; \boxed{-3,2} \; \right)\quad \textsf{(smaller $x$-value)}


(x,y)=\left(\; \boxed{1,0} \; \right)\quad \textsf{(larger $x$-value)}

Explanation:

Given system of equations:


\begin{cases}\;\;\;\;\;\;\;y^2=1-x\\x+2y=1\end{cases}

To solve by the method of substitution, rearrange the second equation to make x the subject:


\implies x=1-2y

Substitute the found expression for x into the first equation and rearrange so that the equation equals zero:


\begin{aligned}x=1-2y \implies y^2&=1-(1-2y)\\y^2&=1-1+2y\\y^2&=2y\\y^2-2y&=0\end{aligned}

Factor the equation:


\begin{aligned}\implies y^2-2y&=0\\y(y-2)&=0\end{aligned}

Apply the zero-product property and solve for y:


\implies y=0


\implies y-2=0 \implies y=2

Substitute the found values of y into the second equation and solve for x:


\begin{aligned}y=0 \implies x+2(0)&=1\\x&=1\end{aligned}


\begin{aligned}y=2 \implies x+2(2)&=1\\x+4&=1\\x&=-3\end{aligned}

Therefore, the solutions are:


(x,y)=\left(\; \boxed{-3,2} \; \right)\quad \textsf{(smaller $x$-value)}


(x,y)=\left(\; \boxed{1,0} \; \right)\quad \textsf{(larger $x$-value)}

User Mardi
by
2.7k points
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