Chapter 1: Limits
Section 1.5: Limits at Infinity and Infinite Limits
Evaluate limx→∞pxqx, where p and q are respectively, the cubic polynomials 4 x3+5 x2+6 x+7, and 7 x3+6 x2+5 x+4.
Enter the data
Control-drag (or type) p.
Context Panel: Assign to a Name≻p
4 x3+5 x2+6 x+7→assign to a namep
Control-drag (or type) q.
Context Panel: Assign to a Name≻q
7 x3+6 x2+5 x+4→assign to a nameq
Apply Maple's limit operator
Expression palette: Limit operator
Context Panel: Evaluate and Display Inline
limx→∞pq = 47
Draw a graph
Code for Figure 1.5.1(a) is hidden in the cell containing the graph.
To obtain Figure 1.5.1(a) interactively, invoke the Plot Builder on p/q. This results in the black curve shown in Figure 1.5.1(a).
To add the horizontal asymptote, copy/paste the fraction 4/7 onto the graph of p/q.
The line y=4/7 is a horizontal asymptote
(The relevant options for the Plot Builder are "2-D plot",where the range for x, and the view for axis can be set.)
use plots in
Figure 1.5.1(a) Graph of p/q and its horizontal asymptote (red)
Divide p by x3, where 3 is the highest power in the denominator.
Press the Enter key.
Context Panel: Expand≻Expand
Context Panel: Assign to a Name≻P
→assign to a name
limx→∞P = 4
Divide q by x3, where 3 is the highest power in the denominator.
Press the Enter key.
limx→∞Q = 7≠0
Divide P by Q
PQ = 4+5x+6x2+7x37+6x+5x2+4x3
The limit of the rational function pq is the limit of PQ. Since limx→∞Q≠0, apply the Quotient rule.
The limit of PQ is the quotient of the limits, namely, 47. Note how the limit is the ratio of the coefficients of the leading terms in the numerator and denominator of p and q, respectively.
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