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sustained interference patter is the pattern in which positions of maxima and minima remains fixed all along the slits.conditions for sustained interference aresoureces must be coherentsources should emit light continouslysources must be close to each othersources should be narrow
sustained interference patter is the pattern in which positions of maxima and minima remains fixed all along the slits.conditions for sustained interference aresoureces must be coherentsources should emit light continouslysources must be close to each othersources should be narrow
Highest point reached by a curve. Minima is lowest.
Constructive interference is and interference that happens in any location along the medium where the two interfering waves have a displacement in the same direction. Destructive interference is interference that happens at any place along the medium where the two interfering waves have a displacement in the opposite direction.
ramlal says its the difference between the maxima and the minima.
Caffeine having different wavelents it having 2 maximas and 1 minima. 1st maxima is 205nm 2nd maxima is 273nm minima is 245nm and it is primary reference standard and also suggested in pharmacopiea. -Rajesh,Orchid
Caffeine having different wavelents it having 2 maximas and 1 minima. 1st maxima is 205nm 2nd maxima is 273nm minima is 245nm and it is primary reference standard and also suggested in pharmacopiea. -Rajesh,Orchid
A polynomial of degree 4 can have up to 3 local maxima/minima.
The highest parts are the peaks, and the lowest points are the troughs. These could also be described as maxima and minima.
Plot the function. You may have found an inflection point.
A straight line has no turning points and so no local maxima or minima. The line has a maximum at + infinity and a minimum at - infinity if m > 0 and conversely if m < 0. When m = 0, the line is horizontal and so has no maximum or minimum. ([Alternatively, every point on the line is simultaneously a maximum and a minimum.]
If the degree of the polynomial is odd, the range is all real numbers - for example, y = x5. If the degree is even, use derivatives to find maxima or minima. You learn about derivatives, maxima and minima in any basic calculus course. Example: y = x4 - 3x3 Take the derivative: y' = 4x3 - 9x2 Solve for zero: 4x3 - 9x2 = 0 This will give you two maxima or minima; in this case, check at which of these points the function has the smallest value. Because of the positive coefficient of the leading term, the function values go from this point all the way to plus infinity.