Chapter 2 Challenge Problems

The central curve of the Gateway Arch in St. Louis, Missouri (Figure 1), was designed by the equation \[y = 211.49 - 20.96 \cosh 0.03291765x \cmaa \abs x \leq 91.20 \cma\] where \(x\) and \(y\) are measured in meters and \(y\) is the height above the ground.

Calculate the maximum height of the central arch.
At what points is the height \(80\) meters?
Calculate the slope of the arch at the points in part (b).

\(\hspace{0.56em}2.\)

Let \(f(x) = x^2\) and \(g(x) = -x^2 - C.\) Find the value of \(C\) such that the line tangent to \(f\) at \(x = 2\) is also tangent to \(g.\)

\(\hspace{0.56em}3.\)

Let \(f(x) = x^2 + C\) and \(T(x) = 6x - 5.\) Find the value of \(C\) such that \(T\) is the linearization of \(f\) at \(x = 3.\)

\(\hspace{0.56em}4.\)

At some \(x,\) suppose that the slope of the tangent to \(f(x)\) equals the slope of the tangent to \(1/f(x),\) where \(f(x) \ne 0.\) What is this slope?

\(\hspace{0.56em}5.\)

If \(f\) is differentiable at \(a,\) then calculate the following limit in terms of \(f'(a) \col\) \[\lim_{x \to a} \frac{f(x) - f(a)}{\sqrt x - \sqrt a} \pd\]

\(\hspace{0.56em}6.\)

Let \(R\) be the region in the first quadrant bounded between the coordinate axes and the line tangent to the curve \(y = 1/x\) at any point \((a, 1/a).\) Does the area of \(R\) depend on \(a \ques\)

\(\hspace{0.56em}7.\)

Find the value of \[\lim_{x \to \pi/2} \frac{e^{\cos x} - 1}{x - \dfrac{\strut \pi}{2}} \pd\]

\(\hspace{0.56em}8.\)

For any real number \(c,\) use the limit definition of a derivative to prove that \[\deriv{}{x} \sin(x + c) = \cos(x + c) \pd\]

\(\hspace{0.56em}9.\)

For what value of \(C\) does the equation \(x^2 = C + \ln x\) have only one solution?

\(10.\)

Determine the area of the triangle bounded between the \(y\)-axis, the tangent line to \(y = \ln x\) at \(x = e,\) and the normal line to \(y = \ln x\) at \(x = e.\)

\(11.\)

Let \(k\) be any constant and \(n\) be a positive integer. Consider the function \(f(x) = \sin kx.\) Write an expression for \(f^{(n)}(x)\) when \(n\) is even and when \(n\) is odd. (Hint: The number \(-1\) becomes positive when raised to an even power and negative when raised to an odd power.)

\(12.\)

Find the value of \(b\) such that the parabola \(y = x^2 + b\) is tangent to \(y = \abs x.\)

\(13.\)

Let \(k\) be a positive constant. Line \(\ell\) is tangent to the curve \(f(x) = e^{kx}\) at \(x = a\) and strikes the \(x\)-axis at \((c, 0).\)

Calculate \(\lim_{k \to \infty} c.\)
Show that \(\lim_{k \to 0^+} c = -\infty.\) What does this result mean geometrically?
Using differentials, approximate the amount by which \(c\) changes as \(k\) increases from \(2\) to \(2.1.\)
With \(a\) held constant, the value of \(k\) increases at a constant rate of \(2\) units per minute. When \(k = 4,\) how quickly is \(c\) changing with time?

\(14.\)

Consider the family of functions \(f(x) = 1/(x^2 + 4x + k),\) where \(k\) is a constant.

Show that \[f'(x) = \frac{-2x - 4}{\par{x^2 + 4x + k}^2} \pd\]
If \(k = 4,\) then find the only vertical asymptote to the graph of \(y = f(x).\)
For \(k \ne 4,\) determine the \(x\)-coordinate at which the graph of \(y = f(x)\) has a horizontal tangent.
Determine and interpret \[\lim_{x \to -\infty} f'(x) \and \lim_{x \to \infty} f'(x) \pd\]
Show that \(f\) has no vertical asymptotes if \(k \gt 4.\)

\(15.\)

Is there a value of \(x\) at which the tangent lines to the graphs of \(f(x) = \tfrac{1}{4} x^4 + 12x,\) \(g(x) = x^3 + 2x^2,\) and \(h(x) = 2x^2 + 27x + 2\) are all parallel to each other? If so, then find this value of \(x.\)

\(16.\)

In Figure 2, with the aid of a graphing calculator, calculate the angle \(\theta\) between a support beam and the freely hanging cable.

\(17.\)

A circle of radius \(r\) is centered at point \(C\) on the \(y\)-axis and is inscribed in the triangle formed by the graph of \(y = \abs x\) and the horizontal line \(\ell,\) as shown in Figure 3. In terms of \(r,\) calculate the area of \(\Delta OPQ.\)

\(18.\)

The function \(f(x) = 1/x + \atan x\) is one-to-one for \(x \gt 0.\) Show that \[\lim_{x \to (\pi/2)^+} \par{\inv f}'(x) = -\infty \pd\]