wizardcool2005
Answered

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Use the drawing tool(s) to form the correct answer on the provided graph.
Consider the system of equations.



The first equation in the system is graphed below. Graph the linear equation on the coordinate plane and use the Mark Feature tool to place a point at the solution(s) of the system.

Use The Drawing Tools To Form The Correct Answer On The Provided Graph Consider The System Of Equations The First Equation In The System Is Graphed Below Graph class=

Sagot :

gmany

Answer:

(-7, 0) and (0, -7)

Step-by-step explanation:

Draw the graph of x = - y - 7.

Convert to the slope-intercept form (y = mx + b):

x = -y - 7      add y to both sides

x + y = -7     subtract x from both sides

y = -x - 7

This is the straight line equation. We only need two points to plot the graph.

Choose any value of x, put to the equation and calculate the value of y.

for x = 0:

y = -0 - 7 = -7 → (0, -7)

for x = -7:

y = -(-7) - 7 = 7 - 7 = 0 → (-7, 0)

Mark points in the coordinate system and draw a line.

The intersection points of the circle and the line are the solution.

View image gmany

Answer:

(-7, 0) and (0, -7)

Step-by-step explanation:

Draw the graph of x = - y - 7.

Convert to the slope-intercept form (y = mx + b):

x = -y - 7      add y to both sides

x + y = -7     subtract x from both sides

y = -x - 7

This is the straight line equation. We only need two points to plot the graph.

Choose any value of x, put to the equation and calculate the value of y.

for x = 0:

y = -0 - 7 = -7 → (0, -7)

for x = -7:

y = -(-7) - 7 = 7 - 7 = 0 → (-7, 0)

Mark points in the coordinate system and draw a line.

The intersection points of the circle and the line are the solution.

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