1.- The extrema of the function y = x4- 3x3+ x2 are
a) maxima x = 0 and 2, minimum x = 1/4
b) minima x = 0 and 2, maximum x = 1/4
c) maximum x = 0 and minimum x = 4
d) it has no extrema
2.- The function y = x·lnx is increasing in the interval:
a) (0,1/e)
b) (1/e,∞)
c) (0,1)
d) (1,∞)
3.- The extremum of the function y = x·lnx is:
a) maximum x = 1
b) minimum x = 1
c) maximum x = 1/e
d) minimum x = 1/e
4.- Which is the inflection point of the function
?
a) x =1
b) x = 0
c) x = -1
d) x = -2
5.- The interval in which the function is concave up
is:
a) (-∞,-1)U(0,1)
b) (-∞,-2)U(1,∞)
c) (-2,1)
d) (-1,0)U(1,∞)
6.- Consider a rectangle of perimeter 12 m. Form a cylinder by revolving this rectangle about one of its edges. What dimensions of the rectangle will result in a cylinder of maximum volume?
a) r = 3 m and h = 3 m
b) r = 1 m and h = 5 m
c) r = 4 m and h = 2 m
d) None of them
7.- Find the point (x,y) on the graph of y = √x nearest to the point (4,0).
a) (0,0)
b) (7/2,√14/2)
c) (4,2)
d) (2,√2)
8.- (PAEG- June 2014) Let the function
Find the relative extrema in the interval (0,∞)
c) maximum x = 1; minimum x = 2
9.- Calculate the intervals of increasing and decreasing in (0,∞) of the function in exercise 8
a) decreasing (0,1); increasing (1,∞)
b) decreasing (1,∞); increasing (0,1)
c) decreasing (1,2); increasing (0,1)U(2,∞)
10.- (PAEG- June 2014) Let the function:
Draw its graph
a)
b)
c)
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