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5 Apr 2020
To solve the equation
graphically, we graph the function
and
on the same set of axes and determine the value of
at which the graphs of
and
intersect. Graph
and
below, and use the graphs to solve the equation the solution is ![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAEUAAAAJBAMAAACWOfwNAAAACXBIWXMAAABkAAAAZAAPlsXdAAAAIVBMVEUAAABHcEwAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAACArOP1AAAACnRSTlNEAIgzWSJ3EbCZ6z5vcwAAAFVJREFUGNNjEHFLaRbECwQYSgQa1QUFg5SAAKeacqFEQULmCEoYAukioDFqONWYVAk6gmgGBmacajIzXQIJ2SUsaEjYPQQBmhphoLNYBQ2AZCCCGQAAaP8acURF9lMAAAAASUVORK5CYII=)
![](data:image/png;base64,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)
To solve the equation graphically, we graph the function
and
on the same set of axes and determine the value of
at which the graphs of
and
intersect. Graph
and
below, and use the graphs to solve the equation the solution is
Irving HeathcoteLv2
28 May 2020