2 Let Note That X 1 Is Not In The Domain Off Since X 1 Would Make The Denominator Equal To Zero Use The Table Below 1 (49.17 KiB) Viewed 51 times
2 Let Note That X 1 Is Not In The Domain Off Since X 1 Would Make The Denominator Equal To Zero Use The Table Below 2 (54.24 KiB) Viewed 51 times
2 Let Note That X 1 Is Not In The Domain Off Since X 1 Would Make The Denominator Equal To Zero Use The Table Below 3 (45 KiB) Viewed 51 times
2 Let Note That X 1 Is Not In The Domain Off Since X 1 Would Make The Denominator Equal To Zero Use The Table Below 4 (46.82 KiB) Viewed 51 times
2 Let Note That X 1 Is Not In The Domain Off Since X 1 Would Make The Denominator Equal To Zero Use The Table Below 5 (40.76 KiB) Viewed 51 times
2 Let Note That X 1 Is Not In The Domain Off Since X 1 Would Make The Denominator Equal To Zero Use The Table Below 6 (54.44 KiB) Viewed 51 times
2. Let Note that x = 1 is not in the domain off since x=1 would make the denominator equal to zero. Use the table below to investigate what happens to f(x) as x gets closer and closer to 1. x left of 1 f(x) x right of 1 f(x) 0 1 2 7 13 1.39 1.7 5.59 .6 1.96 1.4 4.36 .9 2.71 1.1 3.31 .99 2.9701 1.01 3.0301 .999 2.997000999 1.001 3.003000999 .9999 2.999700029 1.0001 3.000300030 From left: lim f(x) = From right: lim f(x) 2-1 lim (x) -
3. let S(x)= {-*+2 ifxsi (x-2 ifx>1 Use the table below to investigate what happens to f(x) as x gets closer and closer to 1. x left of 1 f(x) x right of 1 f(x) 0 2 2 0 .3 1.7 1.7 -0.3 .6 1.4 1.4 -0.6 9 1.1 1.1 -0.9 .99 1.01 1.01 -0.99 .999 1.001 -0.999 1.001 1.0001 1.0001 -0.9999 .9999 From left: lim f(x) From right: lim f(x) 1 lim f(x)= 1-1
Let f(x) Use the table below to investigate what happens to f(x) as x gets closer and closer to O. x left of o f(x) x right of fbx) -0.5 0.7869 0.5 1.2974 -0.25 0.8848 0.25 1.1361 -0.1 0.9516 0.1 1.0517 -0.001 0.9950 0.001 1.0050 -0.0001 0.9995 0.0001 1.0005 From left: lim f(x) = From right: lim /(x) = Tim /(x) =
5. +14 12 12, 12) 18 -2 lim (*) lim S(x)- I- lim (*)
6. (-1,2) 12 (12) .11.11 (1.01 -2 1 a. (1) b. lim /(x) = clim f(x) - d. li 2. (-1) = f. lim (x) - B. lim (1) halim x) -
7. X-1 let f(x)--- Use the table below to investigate what happens to f(x) as x gets closer and closer to 1. x left of 1 f(x) x right of 1 f(x) 0 -1 2 1 .3 -1.4286 1.7 1.4286 .6 -2.5 1.4 2.5 9 -10 1.1 10 .99 -100 1.01 100 .999 -1000 1.001 1000 .9999 -10,000 1.0001 10,000 From left: lim f(x) 1+1 From right: lim f(x) lim f(x)=
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