When z = f(x,y), which of the following is true for the whole statement?O d2z = f"(x).dx2 and dx2 is always zero, so f"(x) will determine the sign of d²z.O d2z = f'(x).dx² and dx2 is always zero, so f'(x) will determine the sign of dz.O d²z = f"(x).dx² and dx2 is always positive, so f"(x) will not determine the sign of d²z.O ddz = f"(x).dx2 and dx2 is always negative, so f"(x) will determine the sign of d2z.O d²z = f"(X).dx² and dx2 is always positive, so f"(X) will determine the sign of d2z.

Answered: Image /qna-images/answer/55e847e4-10b3-4169-98c9-fcc57657c47b.jpg

When z = f(x,y), which of the following is true for the whole statement? O ddz = f"(x).dx² and dx2 is always zero, so f"(x) will determine the sign of d2z. d2z = f"(x).dx2 and dx2 is always zero, so f'(x) will determine the sign of d²z. O d²z = f'(x).dx² and dx2 is always positive, so f"(X) will not determine the sign of d²z. O d2z = f'(x).dx2 and dx2 is always negative, so f"(x) will determine the sign of d²z. O d2z = f"(x).dx² and dx2 is always positive, so f"(X) will determine the sign of d2z.

When z = f(x,y), which of the following is true for the whole statement? O ddz = f"(x).dx² and dx2 is always zero, so f"(x) will determine the sign of d2z. d2z = f"(x).dx2 and dx2 is always zero, so f'(x) will determine the sign of d²z. O d²z = f'(x).dx² and dx2 is always positive, so f"(X) will not determine the sign of d²z. O d2z = f'(x).dx2 and dx2 is always negative, so f"(x) will determine the sign of d²z. O d2z = f"(x).dx² and dx2 is always positive, so f"(X) will determine the sign of d2z.

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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Question

When z = f(x,y), which of the following is true for the whole statement?
O d2z = f"(x).dx2 and dx2 is always zero, so f"(x) will determine the sign of d²z.
O d2z = f'(x).dx² and dx2 is always zero, so f'(x) will determine the sign of dz.
O d²z = f"(x).dx² and dx2 is always positive, so f"(x) will not determine the sign of d²z.
O ddz = f"(x).dx2 and dx2 is always negative, so f"(x) will determine the sign of d2z.
O d²z = f"(X).dx² and dx2 is always positive, so f"(X) will determine the sign of d2z.

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