Business Calculus
Evaluate sinh(0)\(\sinh\]\left\)(0\(\right\))sinh(0) given that the definition of the hyperbolic sine function is, sinh(x)=ex−e−x2\(\sinh\]\left\)(x\(\right\))=\(\frac{e^{x}\)-e^{-x}}{2}sinh(x)=2ex−e−x, and sketch a plausible graph for y=sinh(x)y=\(\sinh\)(x)y=sinh(x).
Given that a function hh satisfies 0≤j(x)≤1−cosx0\(\le\) j\(\left\)(x\(\right\))\(\le\)1-\(\cos\) x for all xx near 00, determine limx→0j(x)\(\lim\)_{x\(\to\)0}j\(\left\)(x\(\right\)).
Evaluate the limit:
limh→0tan(tan(h))tan(h){{\(\displaystyle\]\lim\)_{h\(\to\)0}\(\frac{\tan\left(\tan\left(h\right)\right)}{\tan\left(h\right)}\)}}
Find the limit of the polynomial function f(x)=x3−2x2+3x−4f\(\left\)(x\(\right\))=x^3-2x^2+3x-4f(x)=x3−2x2+3x−4 as xxx approaches 000.
Determine all vertical asymptotes x=ax=a of the function f(x)=2x+3x4−8x3+16x2f\(\left\)(x\(\right\))=\(\frac{2x+3}{x^4-8x^3+16x^2}\). Evaluate limx→a+f(x){\(\displaystyle\]\lim\)_{x\(\to\) a^{+}}}f\(\left\)(x\(\right\)), limx→a−f(x){\(\displaystyle\]\lim\)_{x\(\to\) a_{}^{-}}}f\(\left\)(x\(\right\)), and limx→a f(x){\(\displaystyle\]\lim\)_{x\(\to\) a}}\(\text{ }\)f\(\left\)(x\(\right\)) for each value of aa.
Determine the limit:
limx→∞(x2+36−x2−4){\(\displaystyle\]\lim\)_{x\(\to\[\infty\)}}\(\left\)(\(\sqrt{x^2+36}\)-\(\sqrt{x^2-4}\]\right\))
Identify the interval of continuity for the function h(x)=4x2−8x+93x2+3x+3h(x)=\(\frac{4x^2-8x+9}{3x^2+3x+3}\).
Find the limit as x→π2x\(\to\]\frac{\pi}{2}\)x→2π of the expression cos(π4sin(cosx))\(\cos\]\left\)(\(\frac{\pi}{4}\[\sin\]\left\)(\(\cos\) x\(\right\))\(\right\)). Determine if the function is continuous at the point being approached.
Find the value of aa that ensures the function h(x)={sin4(2x)x4,x≠0a,x=0h\(\left\)(x\(\right\))=\(\begin{cases}\]\frac{\sin^4\left(2x\right)}{x^4}\),x\(\ne\)0\\ a,x=0\(\end{cases}\) is continuous at x=0x=0.
