The tension \(\mathbf{T}\) at each end of a chain has magnitude 25 N (see the figure). What is the weight of the chain?

The speed of a vehicle is increasing at a rate of \(7.3\) meters per second squared. What is this rate, in miles per minute squared, rounded to the nearest tenth? (Use 1 mile = 1,609 meters.)

\(-9x^2 + 30x + c = 0\) In the given equation, \(c\) is a constant. The equation has exactly one solution. What is the value of \(c\)?

Evaluate the limit, if it exists. \(\operatorname*{lim}\limits_{t \rightarrow 0} \dfrac{\sqrt{1 + t} - \sqrt{1 - t}}{t}\)

Match the graphs of the parametric equations \(x = f(t)\) and \(y = g(t)\) in (a)-(d) with the parametric curves labeled I-IV. Give reasons for your choices.

What does the limit statement \(\operatorname*{lim}\limits_{x \rightarrow 1} \dfrac{\ln(x + 1) - \ln 2}{x - 1}\) represent?

Differentiate. \(h(\theta) = \theta^2 \sin \theta\)

A circle in the \(x y\)-plane has the equation \((x - 13)^2 + (y - k)^2 = 64\). Which of the following gives the center of the circle and its radius?

A set of numbers is called sum-free if whenever \(x\) and \(y\) are (not necessarily distinct) elements of the set, \(x + y\) is not an element of the set. For example, \({1, 4, 6}\) and the empty set are sum-free, but \({2, 4, 5}\) is not. What is the greatest possible number of elements in a sum-free subset of \({1, 2, 3, ..., 20}\)?

Find \(|\mathbf{u} \times \mathbf{v}|\) and determine whether \(\mathbf{u} \times \mathbf{v}\) is directed into the page or out of the page.