Which of the following would be a valid reason the above function is non-differentiable at x = 0?
mt-5 sb-3-Differentiabilityimg_no 126.jpg
  • The graph contains a corner.
  • The graph contains a cusp.
  • The graph contains a discontinuity.
  • The graph contains a vertical tangent.
Graph of a function is given. Where is the function continuous yet NOT differentiable?
mt-5 sb-3-Differentiabilityimg_no 127.jpg
  • x = a, b, c, d
  • x = b, c, d
  • x = a, b,
  • x = b, d
Where is the function shown in the graph not differentiable?
mt-5 sb-3-Differentiabilityimg_no 128.jpg
  • x = -2, -1, 0, 1
  • x = -2, -1, 1
  • x = -2, -1
  • x = -1,
On what interval(s) is the following function continuous?
mt-5 sb-3-Differentiabilityimg_no 129.jpg
  • (-∞,-2)u(-2,∞)
  • [-2,2]
  • (-2,2)
  • (-∞,-2]u[-2,∞)
0:0:1



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