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It's hard to say, since we're having such a difficult time seeing the graph.
To graph the equation ( y = 2x + 6 ), start by identifying the y-intercept, which is 6 (the point where the line crosses the y-axis). Plot the point (0, 6) on the graph. Next, use the slope, which is 2 (or ( \frac{2}{1} )), to find another point; from (0, 6), rise 2 units up and run 1 unit to the right to plot the point (1, 8). Finally, draw a straight line through the two points to represent the graph of the equation.
If you mean y = -2x-6 then y intersect the graph at (0, -6)
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The graph of ( \log(x) + 6 ) is a vertical translation of the graph of ( \log(x) ) upwards by 6 units. This means that every point on the graph of ( \log(x) ) is shifted straight up by 6 units, while the shape and orientation of the graph remain unchanged. The domain of the function remains the same, which is ( x > 0 ).
It's hard to say, since we're having such a difficult time seeing the graph.
To graph the equation ( y = 2x + 6 ), start by identifying the y-intercept, which is 6 (the point where the line crosses the y-axis). Plot the point (0, 6) on the graph. Next, use the slope, which is 2 (or ( \frac{2}{1} )), to find another point; from (0, 6), rise 2 units up and run 1 unit to the right to plot the point (1, 8). Finally, draw a straight line through the two points to represent the graph of the equation.
Graph and Table: http://i50.tinypic.com/szhr4k.png
If you mean y = -2x-6 then y intersect the graph at (0, -6)
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0,-1,-2,-3,-4,-5,-6,-7,-8,-9,-10,ect.
Draw the x and y axises. Draw 6 tic marks to represent "6." Draw a horizontal line right through with arrows (< and >) at the end to represent that it is constant.
The graph of ( \log(x) + 6 ) is a vertical translation of the graph of ( \log(x) ) upwards by 6 units. This means that every point on the graph of ( \log(x) ) is shifted straight up by 6 units, while the shape and orientation of the graph remain unchanged. The domain of the function remains the same, which is ( x > 0 ).
{0, 0, 0, 0, 0, 0, 6} is one possible set.
Points: (0, -2) and (6, 0) Slope: 1/3 Equation of line: 3y = x-6
Plug in numbers. If you don't know which numbers to plug in, solve the equation for y to give you a better idea. It ends up being y=(-x/3) - 2
A gain of 6 kg in weight