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f is a piecewise smooth funtion on [a,b] if f and f ' are piecewise continuous on [a,b]
An intuitive answer (NOTE: this is far from precise!) A function is continuous if you can trace its graph without lifting your pencil from the page. If, additionally, it is smooth everywhere without any jagged edges or abrupt corners, then it is differentiable. It is not possible for a function to be differentiable but not continuous. On the other hand, plenty of functions are continuous without being differentiable.
it is called circle because it is circular. circular means smooth, rounded edges. a circle matches that description.
the smooth-sided is smooth but the stepped has a six huged steps at the top for the robbers
Any smooth surface will reflect light. The better question is "How much light does each kind of smooth surface reflect?"
a line that deviates from straightness in a smooth continuous fashion.... it is a line w/ is not straight...
No it is not.
The world appears smooth and continuous because we are not sensitive to the small scale microworld of the quanta
f is a piecewise smooth funtion on [a,b] if f and f ' are piecewise continuous on [a,b]
produce smooth, continuous muscle contraction
The endoplasmic reticulum
That's an easy one the answer is continuity
direct relationship.
renal cortex
The moons smooth parts are called Maria
The smooth and shiny lava is called pahoehoe.
A smooth stone is called a buttockslim and a smooth stone with banded layers is called a bandedass. Horse Isle Answer: Agate