Bartleby Sitemap - Textbook Solutions
All Textbook Solutions for Precalculus
17RE18RE19RE20RE21RE22RE23RE24RE25RE26RE27RE28RE29RE30RE31RE32RE33RE34RE35RE36RE37RE38RE39RE40RE41RE42RE43RE44RE45RE46RE47RE48RE49RE50RE51RE52RE53RE54RE55RE56RE57RE58RE59RE60RE61RE62RE63RE64RE65RE66RE67RE68RE69RE70RE71RE72RE73RE74RE75RE76RE77RE78RE79RE80RE81RE82RE83RE84RE1CT2CT3CT4CT5CT6CT7CT8CT9CT10CT11CT12CT13CT14CT15CT16CTAn object is moving along a straight line according to some position function s=s(t). The distance s(in feet) of the object, from its starting point after t seconds is given in the table. Find the average rate of change of distance from t=3 to t=6 seconds. ts0012.5214331449589613771738240Graph f( x )={ 3x2ifx2 3ifx=2 (pp.100-102)2AYU3AYU4AYUTrue or False lim xc f( x )=N may be described by saving that the value of f( x ) gets closer to N as x gets closer to c but remains unequal to c .6AYUlim x2 ( 4 x 3 )lim x3 ( 2 x 2 +1 )lim x0 x+1 x 2 +110AYU11AYU12AYU13AYU14AYU15AYU16AYUIn Problems 17-22, use the graph shown to determine if the limit exists. If it does, find its value. lim x2 f( x )In Problems 17-22, use the graph shown to determine if the limit exists. If it does, find its value. lim x4 f( x )In Problems 17-22, use the graph shown to determine if the limit exists. If it does, find its value. lim x2 f( x )20AYUIn Problems 17-22, use the graph shown to determine if the limit exists. If it does, find its value. lim x2 f( x )22AYU23AYU24AYU25AYU26AYUIn Problems 23-42, graph each function. Use the graph to find the indicated limit, if it exists. lim x3 f( x ),f( x )=| 2x |28AYU29AYU30AYUIn Problems 23-42, graph each function. Use the graph to find the indicated limit, if it exists. lim x0 f( x ),f( x )= e x32AYU33AYU34AYUIn Problems 23-42, graph each function. Use the graph to find the indicated limit, if it exists. lim x0 f( x ),f( x )={ x 2 ifx0 2xifx0In Problems 23-42, graph each function. Use the graph to find the indicated limit, if it exists. lim x0 f( x ),f( x )={ x1ifx0 3x1ifx0In Problems 23-42, graph each function. Use the graph to find the indicated limit, if it exists. lim x1 f( x ),f( x )={ 3xifx1 x+1ifx138AYU39AYU40AYU41AYU42AYUIn Problems 43-48, use a graphing utility to find the indicated limit rounded to two decimal places. lim x1 x 3 x 2 +x1 x 4 x 3 +2x244AYU45AYU46AYU47AYUIn Problems 43-48, use a graphing utility to find the indicated limit rounded to two decimal places. lim x3 x 3 3 x 2 +4x12 x 4 3 x 3 +x31AYU2AYU3AYU4AYU5AYU6AYU7AYU8AYU9AYU10AYU11AYU12AYU13AYU14AYU15AYU16AYU17AYU18AYU19AYU20AYU21AYU22AYU23AYU24AYU25AYU26AYU27AYU28AYU29AYU30AYU31AYU32AYU33AYU34AYU35AYU36AYU37AYU38AYU39AYU40AYU41AYU42AYUIn Problems 43-52, find the limit as x approaches c of the average rate of change of each function from c to x . c=2 ; f( x )=5x344AYU45AYU46AYU47AYUIn Problems 43-52, find the limit as x approaches c of the average rate of change of each function from c to x . c=1 ; f( x )=2 x 2 3x49AYU50AYU51AYU52AYUIn problems 53-56, use the properties of limits and the facts that lim x0 sinx x =1 lim x0 cosx1 x =0 lim x0 sinx=0 lim x0 cosx=1 where x is in radians, to find each limit. lim x0 tanx x54AYU55AYUIn problems 53-56, use the properties of limits and the facts that lim x0 sinx x =1 lim x0 cosx1 x =0 lim x0 sinx=0 lim x0 cosx=1 where x is in radians, to find each limit. lim x0 sin 2 x+sinx( cosx1 ) x 2For the function f( x )={ x 2 ifx0 x+1if0x2 5xif2x5 , find f( 0 ) and f( 0 ) . (pp. 100-101)2AYU3AYU4AYU5AYU6AYU7AYU8AYU9AYU10AYU11AYUIn Problems 7-42, find each limit algebraically. True or False Every polynomial function is continuous at every real number.In Problems 7-42, find each limit algebraically. What is the domain of f ?14AYU15AYU16AYU17AYU18AYUIn Problems 7-42, find each limit algebraically. lim x1 ( 5 x 4 3 x 2 +6x9 )20AYUFind lim x 4 f( x ) .22AYUFind lim x 2 f( x ) .24AYUDoes lim x4 f( x ) exist? If it does, what is it?26AYUIs f continuous at 4 ?28AYUIs f continuous at 0?30AYUIs f continuous at 4?32AYU33AYU34AYU35AYU36AYU37AYU38AYUlim x 2 + x 2 4 x2lim x 1 x 3 x x1lim x 1 x 2 1 x 3 +142AYU43AYU44AYU45AYU46AYU47AYU48AYUf( x )= x+3 x3 c=350AYU51AYU52AYU53AYU54AYU55AYU56AYUf( x )={ x 3 1 x 2 1 ifx1 2ifx=1 3 x+1 ifx1 c=158AYU59AYU60AYU61AYU62AYU63AYU64AYU65AYU66AYU67AYU68AYUf( x )= 2x+5 x 2 470AYU71AYU72AYU73AYU74AYU75AYU76AYU77AYU78AYU79AYU80AYU81AYU82AYU83AYU84AYU85AYU86AYU87AYU88AYU89AYU90AYU1AYU2AYU3AYUlim xc f( x )f( c ) xc exists, it is called the _________of f at c .5AYU6AYU7AYU8AYU9AYUf( x )=2x+1 at ( 1,3 )11AYU12AYU13AYU14AYU15AYU16AYU17AYU18AYU19AYU20AYU21AYU