Why Is A Corner Not Differentiable at Erin Anderson blog

Why Is A Corner Not Differentiable. In particular, a function f is not differentiable at x = a if the graph has a sharp corner (or cusp) at the point (a, f (a)). apply the definition of differentiability to determine whether or not a function is differentiable at a point a. If f is differentiable at x = a, then f is locally linear at x = a. Zoom in and function and tangent will be more and more similar. a function can be continuous at a point, but not be differentiable there. The function jumps at x x, (is not continuous) like what happens at a step on a flight of stairs. Your $f$ is not differentiable (at $0$) because the limit $$ \lim_{h \to 0} \frac{|h|}{h} $$ does not exist. here are some ways: A function is not differentiable at a if its graph has a corner or kink at a.

Your $f$ is not differentiable (at $0$) because the limit $$ \lim_{h \to 0} \frac{|h|}{h} $$ does not exist. apply the definition of differentiability to determine whether or not a function is differentiable at a point a. Zoom in and function and tangent will be more and more similar. a function can be continuous at a point, but not be differentiable there. A function is not differentiable at a if its graph has a corner or kink at a. here are some ways: If f is differentiable at x = a, then f is locally linear at x = a. The function jumps at x x, (is not continuous) like what happens at a step on a flight of stairs. In particular, a function f is not differentiable at x = a if the graph has a sharp corner (or cusp) at the point (a, f (a)).

PPT 3.2 Differentiability PowerPoint Presentation, free download ID

Why Is A Corner Not Differentiable In particular, a function f is not differentiable at x = a if the graph has a sharp corner (or cusp) at the point (a, f (a)). A function is not differentiable at a if its graph has a corner or kink at a. Your $f$ is not differentiable (at $0$) because the limit $$ \lim_{h \to 0} \frac{|h|}{h} $$ does not exist. The function jumps at x x, (is not continuous) like what happens at a step on a flight of stairs. Zoom in and function and tangent will be more and more similar. In particular, a function f is not differentiable at x = a if the graph has a sharp corner (or cusp) at the point (a, f (a)). a function can be continuous at a point, but not be differentiable there. apply the definition of differentiability to determine whether or not a function is differentiable at a point a. If f is differentiable at x = a, then f is locally linear at x = a. here are some ways: