15.) -6x + 22 +8Determine the x-intercept(s) of g. Report solutions in (x, y) form.Consider g(x) =z-intecept(s) of g:Og has no intercept.Determine the y-intercept of g. Report solutions in (x, y) form.Ⓒy-intecept of g:Og has no y-intecept.Determine the interval(s) on which g is decreasing.Ⓒg is decreasing on:Og is decreasing nowhere.Determine the interval(s) on which g is increasing.Og is increasing on:Og is increasing nowhere.Determine the value and location of any local minimum of g. Enter the solution in (a, g(a)) form. Ifmultiple solutions exist, use a comma-separated list to enter the solutions.Og has a local minimum at:Og has no local minimum.2.2. CUIVE sketchingDetermine the value and location of any local maximum of g. Enter the solution in (z, g(x)) form. Ifmultiple solutions exist, use a comma-separated list to enter the solutions.g has a local maximum at:O g has no local maximum.Determine the interval(s) on which g is concave down.g is concave down on:g is concave down nowhere.Determine the interval(s) on which g is concave up.g is concave up on:O g is concave up nowhere.Determine the value and location of any inflection point of g. Enter the solution in (z, g(x)) form. Ifmultiple solutions exist, use a comma-separated list to enter the solutions.g has an inflection point at:g has no inflection point.Evaluate the following limits:lim g(x):lim g(x)=-100 Determine the location(s) of any vertical asymptote of g.has a vertical asymptote at x =9has no vertical asymptote.Determine the location(s) of any horizontal asymptote of g.O9has a horizontal asymptote at y =9has no horizontal asymptote.The above information should now be used to sketch a complete graph of g. Check the accuracy ofyour graph using Desmos.Submit All Parts0

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