Тригонометриски лимеси
1.
limx→0sin3xx=limx→0cos2xsin3xx=limx→0cosxsin3x3x3xxx=limx→0sin3xx=limx→0cos2xsin3xx=limx→0cosxsin3x3x3xxx= size 12{ {"lim"} cSub { size 8{x rightarrow 0} } { {"sin"3x} over {x} } = {"lim"} cSub { size 8{x rightarrow 0} } { {"cos"2x"sin"3x} over {x} } = {"lim"} cSub { size 8{x rightarrow 0} } { {"cos"x { {"sin"3x} over {3x} } 3x} over { { {x} over {x} } } } ={}} {}
=
lim
x
→
0
3x
cos
x
sin
3x
3x
1
=
lim
x
→
0
3x
cos
x
1
=
lim
x
→
0
3
cos
0
1
=
3
1
=
3
=
lim
x
→
0
3x
cos
x
sin
3x
3x
1
=
lim
x
→
0
3x
cos
x
1
=
lim
x
→
0
3
cos
0
1
=
3
1
=
3
size 12{ {}= {"lim"} cSub { size 8{x rightarrow 0} } { {3x"cos"x { {"sin"3x} over {3x} } } over {1} } = {"lim"} cSub { size 8{x rightarrow 0} } { {3x"cos"x} over {1} } = {"lim"} cSub { size 8{x rightarrow 0} } { {3"cos"0} over {1} } = { {3} over {1} } =3} {}
(1)2.
limx→0sinαxsinβx=limx→0αsinαxαxβsinβxβx=αβ⋅sin0sin0=0limx→0sinαxsinβx=limx→0αsinαxαxβsinβxβx=αβ⋅sin0sin0=0 size 12{ {"lim"} cSub { size 8{x rightarrow 0} } { {"sin"αx} over {"sin"βx} } = {"lim"} cSub { size 8{x rightarrow 0} } { {α { {"sin"αx} over {αx} } } over {β { {"sin"βx} over {βx} } } } = { {α} over {β} } cdot { {"sin"0} over {"sin"0} } =0} {}
3.
limx→0tgkxx=limx→0sinkxcoskxx=limx→0sinkxxcoskx⋅kk=limx→0(ksinkxkx1coskx)=klimx→0tgkxx=limx→0sinkxcoskxx=limx→0sinkxxcoskx⋅kk=limx→0(ksinkxkx1coskx)=k size 12{ {"lim"} cSub { size 8{x rightarrow 0} } { {"tg" ital "kx"} over {x} } = {"lim"} cSub { size 8{x rightarrow 0} } { { { {"sin" ital "kx"} over {"cos" ital "kx"} } } over {x} } = {"lim"} cSub { size 8{x rightarrow 0} } { {"sin" ital "kx"} over {x"cos" ital "kx"} } cdot { {k} over {k} } = {"lim"} cSub { size 8{x rightarrow 0} } \( { {k"sin" ital "kx"} over { ital "kx"} } { {1} over {"cos" ital "kx"} } \) =k} {}
4.
limx→0tan2xsin5x=limx→0sin2xcos2xsin5x=limx→02⋅5xsin2x2⋅5xcos2xsin5x=limx→0tan2xsin5x=limx→0sin2xcos2xsin5x=limx→02⋅5xsin2x2⋅5xcos2xsin5x= size 12{ {"lim"} cSub { size 8{x rightarrow 0} } { {"tan"2x} over {"sin"5x} } = {"lim"} cSub { size 8{x rightarrow 0} } { {"sin"2x} over {"cos"2x"sin"5x} } = {"lim"} cSub { size 8{x rightarrow 0} } { {2 cdot 5x"sin"2x} over {2 cdot 5x"cos"2x"sin"5x} } ={}} {}
=
lim
x
→
0
(
2
5
cos
2x
sin
2x
2x
sin
5x
5x
)
=
2
5
⋅
1
1
=
2
5
=
lim
x
→
0
(
2
5
cos
2x
sin
2x
2x
sin
5x
5x
)
=
2
5
⋅
1
1
=
2
5
size 12{ {}= {"lim"} cSub { size 8{x rightarrow 0} } \( { {2} over {5"cos"2x} } { { { {"sin"2x} over {2x} } } over { { {"sin"5x} over {5x} } } } \) = { {2} over {5} } cdot { {1} over {1} } = { {2} over {5} } } {}
(2)5.
limx→0sin(xn)(sinx)m=limx→0sin(xn)sinmx=limx→0sin(xn)xnsinmxxn=limx→0sin(xn)(sinx)m=limx→0sin(xn)sinmx=limx→0sin(xn)xnsinmxxn= size 12{ {"lim"} cSub { size 8{x rightarrow 0} } { {"sin" \( x rSup { size 8{n} } \) } over { \( "sin"x \) rSup { size 8{m} } } } = {"lim"} cSub { size 8{x rightarrow 0} } { {"sin" \( x rSup { size 8{n} } \) } over {"sin" rSup { size 8{m} } x} } = {"lim"} cSub { size 8{x rightarrow 0} } { { { {"sin" \( x rSup { size 8{n} } \) } over {x rSup { size 8{n} } } } } over { { {"sin" rSup { size 8{m} } x} over {x rSup { size 8{n} } } } } } ={}} {}
=
lim
x
→
0
1
sin
m
x
x
n
+
m
−
m
=
lim
x
→
0
1
sin
m
x
x
m
⋅
x
n
−
m
=
1
1
x
n
−
m
=
{
0,n
>
m
1,n
=
m
∞
,n
<
m
=
lim
x
→
0
1
sin
m
x
x
n
+
m
−
m
=
lim
x
→
0
1
sin
m
x
x
m
⋅
x
n
−
m
=
1
1
x
n
−
m
=
{
0,n
>
m
1,n
=
m
∞
,n
<
m
alignl { stack {
size 12{ {}= {"lim"} cSub { size 8{x rightarrow 0} } { {1} over { { {"sin" rSup { size 8{m} } x} over {x rSup { size 8{n+m - m} } } } } } = {"lim"} cSub { size 8{x rightarrow 0} } { {1} over { { {"sin" rSup { size 8{m} } x} over {x rSup { size 8{m} } cdot x rSup { size 8{n - m} } } } } } = { {1} over {1} } x rSup { size 8{n - m} } = left lbrace matrix {
"0,n ">" m " {} ##
"1,n"=m {} ##
infinity ",n"<m
} right none } {} #
{}
} } {}
(3)6.
limx→01−cosxx2=limx→02sin2x2x2=2limx→0(sinx2x)2=2limx→0(sinx22⋅x2)2=limx→01−cosxx2=limx→02sin2x2x2=2limx→0(sinx2x)2=2limx→0(sinx22⋅x2)2= size 12{ {"lim"} cSub { size 8{x rightarrow 0} } { {1 - "cos"x} over {x rSup { size 8{2} } } } = {"lim"} cSub { size 8{x rightarrow 0} } { {2"sin" rSup { size 8{2} } { {x} over {2} } } over {x rSup { size 8{2} } } } =2 {"lim"} cSub { size 8{x rightarrow 0} } \( { {"sin" { {x} over {2} } } over {x} } \) rSup { size 8{2} } =2 {"lim"} cSub { size 8{x rightarrow 0} } \( { {"sin" { {x} over {2} } } over {2 cdot { {x} over {2} } } } \) rSup { size 8{2} } ={}} {}
=
2
lim
x
→
0
(
1
2
⋅
sin
x
2
x
2
)
2
=
2
⋅
1
4
2
lim
x
→
0
(
sin
x
2
x
2
)
2
=
1
2
(
lim
x
→
0
sin
x
2
x
2
)
2
=
1
2
=
2
lim
x
→
0
(
1
2
⋅
sin
x
2
x
2
)
2
=
2
⋅
1
4
2
lim
x
→
0
(
sin
x
2
x
2
)
2
=
1
2
(
lim
x
→
0
sin
x
2
x
2
)
2
=
1
2
size 12{ {}=2 {"lim"} cSub { size 8{x rightarrow 0} } \( { {1} over {2} } cdot { {"sin" { {x} over {2} } } over { { {x} over {2} } } } \) rSup { size 8{2} } =2 cdot { {1} over { { {4} over {2} } } } {"lim"} cSub { size 8{x rightarrow 0} } \( { {"sin" { {x} over {2} } } over { { {x} over {2} } } } \) rSup { size 8{2} } = { {1} over {2} } \( {"lim"} cSub { size 8{x rightarrow 0} } { {"sin" { {x} over {2} } } over { { {x} over {2} } } } \) rSup { size 8{2} } = { {1} over {2} } } {}
(4)7.
limx→01−cos3xxsin2x=limx→0(1−cosx)(1+cosx+cos2x)x⋅2sinxcosx=limx→02sin2x2(1+cosx+cos2x)2xcosx⋅2sinx2cosx2=limx→01−cos3xxsin2x=limx→0(1−cosx)(1+cosx+cos2x)x⋅2sinxcosx=limx→02sin2x2(1+cosx+cos2x)2xcosx⋅2sinx2cosx2= size 12{ {"lim"} cSub { size 8{x rightarrow 0} } { {1 - "cos" rSup { size 8{3} } x} over {x"sin"2x} } = {"lim"} cSub { size 8{x rightarrow 0} } { { \( 1 - "cos"x \) \( 1+"cos"x+"cos" rSup { size 8{2} } x \) } over {x cdot 2"sin"x"cos"x} } = {"lim"} cSub { size 8{x rightarrow 0} } { {2"sin" rSup { size 8{2} } { {x} over {2} } \( 1+"cos"x+"cos" rSup { size 8{2} } x \) } over {2x"cos"x cdot 2"sin" { {x} over {2} } "cos" { {x} over {2} } } } ={}} {}
=
lim
x
→
0
sin
x
2
(
1
+
cos
x
+
cos
2
x
)
2x
cos
x
cos
x
2
==
1
4
lim
x
→
0
tg
x
2
(
1
cos
x
+
1
+
cos
x
)
x
2
=
1
4
lim
x
→
0
tg
x
2
x
2
=
3
4
=
lim
x
→
0
sin
x
2
(
1
+
cos
x
+
cos
2
x
)
2x
cos
x
cos
x
2
==
1
4
lim
x
→
0
tg
x
2
(
1
cos
x
+
1
+
cos
x
)
x
2
=
1
4
lim
x
→
0
tg
x
2
x
2
=
3
4
size 12{ {}= {"lim"} cSub { size 8{x rightarrow 0} } { {"sin" { {x} over {2} } \( 1+"cos"x+"cos" rSup { size 8{2} } x \) } over {2x"cos"x"cos" { {x} over {2} } } } "==" { {1} over {4} } {"lim"} cSub { size 8{x rightarrow 0} } { {"tg" { {x} over {2} } \( { {1} over {"cos"x} } +1+"cos"x \) } over { { {x} over {2} } } } = { {1} over {4} } {"lim"} cSub { size 8{x rightarrow 0} } { {"tg" { {x} over {2} } } over { { {x} over {2} } } } = { {3} over {4} } } {}
(5)8.
limx→01+sinx−cosx1−sinx−cosx=limx→02sin2x2+sinx2sin2x2−sinx=limx→02sin2x2+2sinx2cosx22sin2x2−2sinx2cosx2=limx→01+sinx−cosx1−sinx−cosx=limx→02sin2x2+sinx2sin2x2−sinx=limx→02sin2x2+2sinx2cosx22sin2x2−2sinx2cosx2= size 12{ {"lim"} cSub { size 8{x rightarrow 0} } { {1+"sin"x - "cos"x} over {1 - "sin"x - "cos"x} } = {"lim"} cSub { size 8{x rightarrow 0} } { {2"sin" rSup { size 8{2} } { {x} over {2} } +"sin"x} over {2"sin" rSup { size 8{2} } { {x} over {2} } - "sin"x} } = {"lim"} cSub { size 8{x rightarrow 0} } { {2"sin" rSup { size 8{2} } { {x} over {2} } +2"sin" { {x} over {2} } "cos" { {x} over {2} } } over {2"sin" rSup { size 8{2} } { {x} over {2} } - 2"sin" { {x} over {2} } "cos" { {x} over {2} } } } ={}} {}
=
lim
x
→
0
2
sin
x
2
(
sin
x
2
+
cos
x
2
)
2
sin
x
2
(
sin
x
2
−
cos
x
2
)
=
0
+
1
0
−
1
=
−
1
=
lim
x
→
0
2
sin
x
2
(
sin
x
2
+
cos
x
2
)
2
sin
x
2
(
sin
x
2
−
cos
x
2
)
=
0
+
1
0
−
1
=
−
1
size 12{ {}= {"lim"} cSub { size 8{x rightarrow 0} } { {2"sin" { {x} over {2} } \( "sin" { {x} over {2} } +"cos" { {x} over {2} } \) } over {2"sin" { {x} over {2} } \( "sin" { {x} over {2} } - "cos" { {x} over {2} } \) } } = { {0+1} over {0 - 1} } = - 1} {}
(6)9.
limx→0(1sinx−1tgx)=limx→0(1sinx−cosxsinx)=limx→01−cosxsin2x=limx→0(1sinx−1tgx)=limx→0(1sinx−cosxsinx)=limx→01−cosxsin2x= size 12{ {"lim"} cSub { size 8{x rightarrow 0} } \( { {1} over {"sin"x} } - { {1} over { ital "tgx"} } \) = {"lim"} cSub { size 8{x rightarrow 0} } \( { {1} over {"sin"x} } - { {"cos"x} over {"sin"x} } \) = {"lim"} cSub { size 8{x rightarrow 0} } { {1 - "cos"x} over {"sin" rSup { size 8{2} } x} } ={}} {}
=
lim
x
→
0
2
sin
2
x
2
2
sin
x
2
cos
x
2
=
lim
x
→
0
tg
x
2
=
0
=
lim
x
→
0
2
sin
2
x
2
2
sin
x
2
cos
x
2
=
lim
x
→
0
tg
x
2
=
0
size 12{ {}= {"lim"} cSub { size 8{x rightarrow 0} } { {2"sin" rSup { size 8{2} } { {x} over {2} } } over {2"sin" { {x} over {2} } "cos" { {x} over {2} } } } = {"lim"} cSub { size 8{x rightarrow 0} } "tg" { {x} over {2} } =0} {}
(7)10.
limx→π2cosx(1−sinx)23=limx→π21−sin2x(1−sinx)23=limx→π2(1−sin2x)3(1−sinx)46=limx→π2cosx(1−sinx)23=limx→π21−sin2x(1−sinx)23=limx→π2(1−sin2x)3(1−sinx)46= size 12{ {"lim"} cSub { size 8{x rightarrow { {π} over {2} } } } { {"cos"x} over { nroot { size 8{3} } { \( 1 - "sin"x \) rSup { size 8{2} } } } } = {"lim"} cSub { size 8{x rightarrow { {π} over {2} } } } { { sqrt {1 - "sin" rSup { size 8{2} } x} } over { nroot { size 8{3} } { \( 1 - "sin"x \) rSup { size 8{2} } } } } = {"lim"} cSub { size 8{x rightarrow { {π} over {2} } } } nroot { size 8{6} } { { { \( 1 - "sin" rSup { size 8{2} } x \) rSup { size 8{3} } } over { \( 1 - "sin"x \) rSup { size 8{4} } } } } ={}} {}
=
lim
x
→
π
2
(
1
−
sin
x
)
3
(
1
+
sin
x
)
3
(
1
−
sin
x
)
4
6
=
lim
x
→
π
2
(
1
+
sin
x
)
3
1
−
sin
x
6
=
2
3
0
6
=
∞
=
lim
x
→
π
2
(
1
−
sin
x
)
3
(
1
+
sin
x
)
3
(
1
−
sin
x
)
4
6
=
lim
x
→
π
2
(
1
+
sin
x
)
3
1
−
sin
x
6
=
2
3
0
6
=
∞
size 12{ {}= {"lim"} cSub { size 8{x rightarrow { {π} over {2} } } } nroot { size 8{6} } { { { \( 1 - "sin"x \) rSup { size 8{3} } \( 1+"sin"x \) rSup { size 8{3} } } over { \( 1 - "sin"x \) rSup { size 8{4} } } } } = {"lim"} cSub { size 8{x rightarrow { {π} over {2} } } } nroot { size 8{6} } { { { \( 1+"sin"x \) rSup { size 8{3} } } over {1 - "sin"x} } } = nroot { size 8{6} } { { {2 rSup { size 8{3} } } over {0} } } = infinity } {}
(8)11.
limx→πsin3xsin2x=limx→π(32⋅sin3x3xsin2x2x)=32⋅limx→πsin3x3xsin2x2x=32⋅11=32limx→πsin3xsin2x=limx→π(32⋅sin3x3xsin2x2x)=32⋅limx→πsin3x3xsin2x2x=32⋅11=32 size 12{ {"lim"} cSub { size 8{x rightarrow π} } { {"sin"3x} over {"sin"2x} } = {"lim"} cSub { size 8{x rightarrow π} } \( { {3} over {2} } cdot { { { {"sin"3x} over {3x} } } over { { {"sin"2x} over {2x} } } } \) = { {3} over {2} } cdot {"lim"} cSub { size 8{x rightarrow π} } { { { {"sin"3x} over {3x} } } over { { {"sin"2x} over {2x} } } } = { {3} over {2} } cdot { {1} over {1} } = { {3} over {2} } } {}
12.
limx→0sin5xsin7x=limx→05x⋅sin5x5x7x⋅sin7x7x=57limx→0sin5x5xsin7x7x=57⋅11=57limx→0sin5xsin7x=limx→05x⋅sin5x5x7x⋅sin7x7x=57limx→0sin5x5xsin7x7x=57⋅11=57 size 12{ {"lim"} cSub { size 8{x rightarrow 0} } { {"sin"5x} over {"sin"7x} } = {"lim"} cSub { size 8{x rightarrow 0} } { {5x cdot { {"sin"5x} over {5x} } } over {7x cdot { {"sin"7x} over {7x} } } } = { {5} over {7} } {"lim"} cSub { size 8{x rightarrow 0} } { { { {"sin"5x} over {5x} } } over { { {"sin"7x} over {7x} } } } = { {5} over {7} } cdot { {1} over {1} } = { {5} over {7} } } {}.
13.
limx→0tgx−sinxx3=limx→0sinxcosx−sinxx3=limx→0sinx−sinxcosxx3cosx=limx→0sinx(1−cosx)x3cosx=limx→0tgx−sinxx3=limx→0sinxcosx−sinxx3=limx→0sinx−sinxcosxx3cosx=limx→0sinx(1−cosx)x3cosx= size 12{ {"lim"} cSub { size 8{x rightarrow 0} } { {"tg"x - "sin"x} over {x rSup { size 8{3} } } } = {"lim"} cSub { size 8{x rightarrow 0} } { { { {"sin"x} over {"cos"x} } - "sin"x} over {x rSup { size 8{3} } } } = {"lim"} cSub { size 8{x rightarrow 0} } { {"sin"x - "sin"x"cos"x} over {x rSup { size 8{3} } "cos"x} } = {"lim"} cSub { size 8{x rightarrow 0} } { {"sin"x \( 1 - "cos"x \) } over {x rSup { size 8{3} } "cos"x} } ={}} {}
lim
x
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0
sin
x
(
1
−
cos
x
)
x
3
cos
x
=
lim
x
→
0
sin
x
(
1
−
cos
x
)
x
3
cos
x
⋅
1
+
cos
x
1
+
cos
x
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lim
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sin
x
(
1
−
cos
2
x
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x
3
cos
x
⋅
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1
+
cos
x
)
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lim
x
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0
sin
x
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1
−
cos
x
)
x
3
cos
x
=
lim
x
→
0
sin
x
(
1
−
cos
x
)
x
3
cos
x
⋅
1
+
cos
x
1
+
cos
x
=
lim
x
→
0
sin
x
(
1
−
cos
2
x
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x
3
cos
x
⋅
(
1
+
cos
x
)
=
size 12{ {"lim"} cSub { size 8{x rightarrow 0} } { {"sin"x \( 1 - "cos"x \) } over {x rSup { size 8{3} } "cos"x} } = {"lim"} cSub { size 8{x rightarrow 0} } { {"sin"x \( 1 - "cos"x \) } over {x rSup { size 8{3} } "cos"x} } cdot { {1+"cos"x} over {1+"cos"x} } = {"lim"} cSub { size 8{x rightarrow 0} } { {"sin"x \( 1 - "cos" rSup { size 8{2} } x \) } over {x rSup { size 8{3} } "cos"x cdot \( 1+"cos"x \) } } ={}} {}
(9)=limx→0sin3xx3cosx(1+cosx)=limx→0sin3xx3⋅limx→01cosx(1+cosx)=13⋅11⋅(1+1)=12=limx→0sin3xx3cosx(1+cosx)=limx→0sin3xx3⋅limx→01cosx(1+cosx)=13⋅11⋅(1+1)=12 size 12{ {}= {"lim"} cSub { size 8{x rightarrow 0} } { {"sin" rSup { size 8{3} } x} over {x rSup { size 8{3} } "cos"x \( 1+"cos"x \) } } = {"lim"} cSub { size 8{x rightarrow 0} } { {"sin" rSup { size 8{3} } x} over {x rSup { size 8{3} } } } cdot {"lim"} cSub { size 8{x rightarrow 0} } { {1} over {"cos"x \( 1+"cos"x \) } } =1 rSup { size 8{3} } cdot { {1} over {1 cdot \( 1+1 \) } } = { {1} over {2} } } {}.
14.
limx→π2(π2−x)tgx=limx→π2(π2−x)sinxcosx=limx→π2(π2−x)sinxsin(π2−x)=limx→π2sinxsin(π2−x)π2−x=11=1limx→π2(π2−x)tgx=limx→π2(π2−x)sinxcosx=limx→π2(π2−x)sinxsin(π2−x)=limx→π2sinxsin(π2−x)π2−x=11=1 size 12{ {"lim"} cSub { size 8{x rightarrow { {π} over {2} } } } \( { {π} over {2} } - x \) "tg"x= {"lim"} cSub { size 8{x rightarrow { {π} over {2} } } } { { \( { {π} over {2} } - x \) "sin"x} over {"cos"x} } = {"lim"} cSub { size 8{x rightarrow { {π} over {2} } } } { { \( { {π} over {2} } - x \) "sin"x} over {"sin" \( { {π} over {2} } - x \) } } = {"lim"} cSub { size 8{x rightarrow { {π} over {2} } } } { {"sin"x} over { { {"sin" \( { {π} over {2} } - x \) } over { { {π} over {2} } - x} } } } = { {1} over {1} } =1} {}
15.
limx→πsinx1−x2π2=limx→πcosx0−π2=−1−2π=π2limx→πsinx1−x2π2=limx→πcosx0−π2=−1−2π=π2 size 12{ {"lim"} cSub { size 8{x rightarrow π} } { {"sin"x} over {1 - { {x rSup { size 8{2} } } over {π rSup { size 8{2} } } } } } = {"lim"} cSub { size 8{x rightarrow π} } { {"cos"x} over {0 - { {π} over {2} } } } = { { - 1} over { - { {2} over {π} } } } = { {π} over {2} } } {}
16.
limz→1(1−z)tgπz2=limz→1(1−z)sinπz2cosπz2=limz→11−zcosπz2limz→1sinπz2=limz→1(1−z)tgπz2=limz→1(1−z)sinπz2cosπz2=limz→11−zcosπz2limz→1sinπz2= size 12{ {"lim"} cSub { size 8{z rightarrow 1} } \( 1 - z \) "tg" { {πz} over {2} } = {"lim"} cSub { size 8{z rightarrow 1} } { { \( 1 - z \) "sin" { {πz} over {2} } } over {"cos" { {πz} over {2} } } } = {"lim"} cSub { size 8{z rightarrow 1} } { {1 - z} over {"cos" { {πz} over {2} } } } {"lim"} cSub { size 8{z rightarrow 1} } "sin" { {πz} over {2} } ={}} {}
=
lim
z
→
1
1
−
z
sin
(
π
2
−
πz
2
)
1
=
lim
z
→
1
1
−
z
sin
π
2
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1
−
z
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lim
z
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1
2
π
π
2
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1
−
z
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sin
π
2
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1
−
z
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=
lim
z
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1
1
−
z
sin
(
π
2
−
πz
2
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1
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lim
z
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1
1
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z
sin
π
2
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1
−
z
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lim
z
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1
2
π
π
2
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1
−
z
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sin
π
2
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1
−
z
)
=
size 12{ {}= {"lim"} cSub { size 8{z rightarrow 1} } { {1 - z} over {"sin" \( { {π} over {2} } - { {πz} over {2} } \) } } 1= {"lim"} cSub { size 8{z rightarrow 1} } { {1 - z} over {"sin" { {π} over {2} } \( 1 - z \) } } = {"lim"} cSub { size 8{z rightarrow 1} } { {2} over {π} } { { { {π} over {2} } \( 1 - z \) } over {"sin" { {π} over {2} } \( 1 - z \) } } ={}} {}
(10)
=
2
π
1
lim
z
→
1
sin
π
2
(
1
−
z
)
π
2
(
1
−
z
)
=
2
π
=
2
π
1
lim
z
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1
sin
π
2
(
1
−
z
)
π
2
(
1
−
z
)
=
2
π
size 12{ {}= { {2} over {π} } { {1} over { {"lim"} cSub { size 8{z rightarrow 1} } { {"sin" { {π} over {2} } \( 1 - z \) } over { { {π} over {2} } \( 1 - z \) } } } } = { {2} over {π} } } {}
(11)17.
limx→π6sin(x−π6)32−cosx=limx→π6cos(x−π6)sinx=112=2limx→π6sin(x−π6)32−cosx=limx→π6cos(x−π6)sinx=112=2 size 12{ {"lim"} cSub { size 8{x rightarrow { {π} over {6} } } } { {"sin" \( x - { {π} over {6} } \) } over { { { sqrt {3} } over {2} } - "cos"x} } = {"lim"} cSub { size 8{x rightarrow { {π} over {6} } } } { {"cos" \( x - { {π} over {6} } \) } over {"sin"x} } = { {1} over { { {1} over {2} } } } =2} {}
18.
limx→π1−sinx2cosx2(cosx4−sinx4)=limx→π(1−sinx2)(1+sinx2)cosx2(cosx4−sinx4)(1+sinx2)=limx→π1−sinx2cosx2(cosx4−sinx4)=limx→π(1−sinx2)(1+sinx2)cosx2(cosx4−sinx4)(1+sinx2)= size 12{ {"lim"} cSub { size 8{x rightarrow π} } { {1 - "sin" { {x} over {2} } } over {"cos" { {x} over {2} } \( "cos" { {x} over {4} } - "sin" { {x} over {4} } \) } } = {"lim"} cSub { size 8{x rightarrow π} } { { \( 1 - "sin" { {x} over {2} } \) \( 1+"sin" { {x} over {2} } \) } over {"cos" { {x} over {2} } \( "cos" { {x} over {4} } - "sin" { {x} over {4} } \) \( 1+"sin" { {x} over {2} } \) } } ={}} {}
=
lim
x
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π
1
−
sin
2
x
2
2
cos
x
2
(
cos
x
4
−
sin
x
4
)
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lim
x
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π
cos
2
x
2
2
cos
x
2
(
cos
x
4
−
sin
x
4
)
=
=
lim
x
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π
1
−
sin
2
x
2
2
cos
x
2
(
cos
x
4
−
sin
x
4
)
=
lim
x
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π
cos
2
x
2
2
cos
x
2
(
cos
x
4
−
sin
x
4
)
=
size 12{ {}= {"lim"} cSub { size 8{x rightarrow π} } { {1 - "sin" rSup { size 8{2} } { {x} over {2} } } over {2"cos" { {x} over {2} } \( "cos" { {x} over {4} } - "sin" { {x} over {4} } \) } } = {"lim"} cSub { size 8{x rightarrow π} } { {"cos" rSup { size 8{2} } { {x} over {2} } } over {2"cos" { {x} over {2} } \( "cos" { {x} over {4} } - "sin" { {x} over {4} } \) } } ={}} {}
=
lim
x
→
π
cos
x
2
(
cos
x
4
+
sin
x
4
)
2
(
cos
x
4
−
sin
x
4
)
(
cos
x
4
+
sin
x
4
)
=
lim
x
→
π
cos
x
2
(
cos
x
4
+
sin
x
4
)
2
(
cos
2
x
4
−
sin
2
x
4
)
=
=
lim
x
→
π
cos
x
2
(
cos
x
4
+
sin
x
4
)
2
(
cos
x
4
−
sin
x
4
)
(
cos
x
4
+
sin
x
4
)
=
lim
x
→
π
cos
x
2
(
cos
x
4
+
sin
x
4
)
2
(
cos
2
x
4
−
sin
2
x
4
)
=
size 12{ {}= {"lim"} cSub { size 8{x rightarrow π} } { {"cos" { {x} over {2} } \( "cos" { {x} over {4} } +"sin" { {x} over {4} } \) } over {2 \( "cos" { {x} over {4} } - "sin" { {x} over {4} } \) \( "cos" { {x} over {4} } +"sin" { {x} over {4} } \) } } = {"lim"} cSub { size 8{x rightarrow π} } { {"cos" { {x} over {2} } \( "cos" { {x} over {4} } +"sin" { {x} over {4} } \) } over {2 \( "cos" rSup { size 8{2} } { {x} over {4} } - "sin" rSup { size 8{2} } { {x} over {4} } \) } } ={}} {}
=
lim
x
→
π
cos
x
2
(
cos
x
4
+
sin
x
4
)
2
cos
x
2
=
cos
π
4
+
sin
π
4
2
=
2
2
+
2
2
2
=
2
2
=
lim
x
→
π
cos
x
2
(
cos
x
4
+
sin
x
4
)
2
cos
x
2
=
cos
π
4
+
sin
π
4
2
=
2
2
+
2
2
2
=
2
2
size 12{ {}= {"lim"} cSub { size 8{x rightarrow π} } { {"cos" { {x} over {2} } \( "cos" { {x} over {4} } +"sin" { {x} over {4} } \) } over {2"cos" { {x} over {2} } } } = { {"cos" { {π} over {4} } +"sin" { {π} over {4} } } over {2} } = { { { { sqrt {2} } over {2} } + { { sqrt {2} } over {2} } } over {2} } = { { sqrt {2} } over {2} } } {}
(12)19.
limx→0cosax−cosbxx2=limx→0−2sinax+bx2sinax−bx2x2=limx→0cosax−cosbxx2=limx→0−2sinax+bx2sinax−bx2x2= size 12{ {"lim"} cSub { size 8{x rightarrow 0} } { {"cos" ital "ax" - "cos" ital "bx"} over {x rSup { size 8{2} } } } = {"lim"} cSub { size 8{x rightarrow 0} } { { - 2"sin" { { ital "ax"+ ital "bx"} over {2} } "sin" { { ital "ax" - ital "bx"} over {2} } } over {x rSup { size 8{2} } } } ={}} {}=−2limx→0(sinx(a+b)2x⋅sinx(a−b)2x)==−2limx→0(sinx(a+b)2x⋅sinx(a−b)2x)= size 12{ {}= - 2 {"lim"} cSub { size 8{x rightarrow 0} } \( { {"sin" { {x \( a+b \) } over {2} } } over {x} } cdot { {"sin" { {x \( a - b \) } over {2} } } over {x} } \) ={}} {}
=
−
2
lim
x
→
0
(
a
+
b
2
⋅
sin
x
(
a
+
b
)
2
(
a
+
b
)
x
2
⋅
a
−
b
2
⋅
sin
x
(
a
−
b
2
)
(
a
−
b
)
2
x
)
=
−
2
⋅
a
+
b
2
⋅
1
⋅
a
−
b
2
⋅
1
=
=
−
2
lim
x
→
0
(
a
+
b
2
⋅
sin
x
(
a
+
b
)
2
(
a
+
b
)
x
2
⋅
a
−
b
2
⋅
sin
x
(
a
−
b
2
)
(
a
−
b
)
2
x
)
=
−
2
⋅
a
+
b
2
⋅
1
⋅
a
−
b
2
⋅
1
=
size 12{ {}= - 2 {"lim"} cSub { size 8{x rightarrow 0} } \( { {a+b} over {2} } cdot { {"sin" { {x \( a+b \) } over {2} } } over { { { \( a+b \) x} over {2} } } } cdot { {a - b} over {2} } cdot { {"sin"x \( { {a - b} over {2} } \) } over { { { \( a - b \) } over {2} } x} } \) = - 2 cdot { {a+b} over {2} } cdot 1 cdot { {a - b} over {2} } cdot 1={}} {}
(13)
=
−
2
⋅
a
2
−
b
2
4
=
−
a
2
−
b
2
2
=
b
2
−
a
2
2
=
−
2
⋅
a
2
−
b
2
4
=
−
a
2
−
b
2
2
=
b
2
−
a
2
2
size 12{ {}= - 2 cdot { {a rSup { size 8{2} } - b rSup { size 8{2} } } over {4} } = - { {a rSup { size 8{2} } - b rSup { size 8{2} } } over {2} } = { {b rSup { size 8{2} } - a rSup { size 8{2} } } over {2} } } {}
(14)20.
limx→02−1+cosxsin2x=limx→02−2cos2x2sin2x=limx→02−2cosx2sin2x=limx→02−1+cosxsin2x=limx→02−2cos2x2sin2x=limx→02−2cosx2sin2x= size 12{ {"lim"} cSub { size 8{x rightarrow 0} } { { sqrt {2} - sqrt {1+"cos"x} } over {"sin" rSup { size 8{2} } x} } = {"lim"} cSub { size 8{x rightarrow 0} } { { sqrt {2} - sqrt {2"cos" rSup { size 8{2} } { {x} over {2} } } } over {"sin" rSup { size 8{2} } x} } = {"lim"} cSub { size 8{x rightarrow 0} } { { sqrt {2} - sqrt {2} "cos" { {x} over {2} } } over {"sin" rSup { size 8{2} } x} } ={}} {}
=
lim
x
→
0
2
(
1
−
cos
x
2
)
sin
2
x
=
lim
x
→
0
2
⋅
2
sin
2
x
4
2
2
sin
2
x
2
cos
2
x
2
=
lim
x
→
0
2
(
1
−
cos
x
2
)
sin
2
x
=
lim
x
→
0
2
⋅
2
sin
2
x
4
2
2
sin
2
x
2
cos
2
x
2
size 12{ {}= {"lim"} cSub { size 8{x rightarrow 0} } { { sqrt {2} \( 1 - "cos" { {x} over {2} } \) } over {"sin" rSup { size 8{2} } x} } = {"lim"} cSub { size 8{x rightarrow 0} } { { sqrt {2} cdot 2"sin" rSup { size 8{2} } { {x} over {4} } } over {2 rSup { size 8{2} } "sin" rSup { size 8{2} } { {x} over {2} } "cos" rSup { size 8{2} } { {x} over {2} } } } } {}
(15)
=
2
2
lim
x
→
0
sin
2
x
4
2
2
⋅
sin
2
x
4
cos
2
x
4
cos
2
x
2
=
2
2
⋅
1
4
⋅
1
⋅
1
=
2
8
=
2
2
lim
x
→
0
sin
2
x
4
2
2
⋅
sin
2
x
4
cos
2
x
4
cos
2
x
2
=
2
2
⋅
1
4
⋅
1
⋅
1
=
2
8
size 12{ {}= { { sqrt {2} } over {2} } {"lim"} cSub { size 8{x rightarrow 0} } { {"sin" rSup { size 8{2} } { {x} over {4} } } over {2 rSup { size 8{2} } cdot "sin" rSup { size 8{2} } { {x} over {4} } "cos" rSup { size 8{2} } { {x} over {4} } "cos" rSup { size 8{2} } { {x} over {2} } } } = { { sqrt {2} } over {2} } cdot { {1} over {4 cdot 1 cdot 1} } = { { sqrt {2} } over {8} } } {}
(16)21.
limx→01+sinx−1−sinxtgx⋅1+sinx+1−sinx1+sinx+1−sinx=limx→01+sinx−1−sinxtgx⋅1+sinx+1−sinx1+sinx+1−sinx= size 12{ {"lim"} cSub { size 8{x rightarrow 0} } { { sqrt {1+"sin"x} - sqrt {1 - "sin"x} } over {"tg"x} } cdot { { sqrt {1+"sin"x} + sqrt {1 - "sin"x} } over { sqrt {1+"sin"x} + sqrt {1 - "sin"x} } } ={}} {}
=
lim
x
→
0
(
1
+
sin
x
)
2
−
(
1
−
sin
x
)
2
sin
x
cos
x
(
1
+
sin
x
+
1
−
sin
x
)
=
=
lim
x
→
0
(
1
+
sin
x
)
2
−
(
1
−
sin
x
)
2
sin
x
cos
x
(
1
+
sin
x
+
1
−
sin
x
)
=
size 12{ {}= {"lim"} cSub { size 8{x rightarrow 0} } { { \( sqrt {1+"sin"x \) } rSup { size 8{2} } - \( sqrt {1 - "sin"x \) } rSup { size 8{2} } } over { { {"sin"x} over {"cos"x} } \( sqrt {1+"sin"x} + sqrt {1 - "sin"x \) } } } ={}} {}
(17)
=
lim
x
→
0
1
+
sin
x
−
1
+
sin
x
sin
x
cos
x
(
1
+
sin
x
+
1
−
sin
x
)
=
lim
x
→
0
2
sin
x
sin
x
cos
x
(
1
+
sin
x
+
1
−
sin
x
)
=
=
lim
x
→
0
1
+
sin
x
−
1
+
sin
x
sin
x
cos
x
(
1
+
sin
x
+
1
−
sin
x
)
=
lim
x
→
0
2
sin
x
sin
x
cos
x
(
1
+
sin
x
+
1
−
sin
x
)
=
size 12{ {}= {"lim"} cSub { size 8{x rightarrow 0} } { {1+"sin"x - 1+"sin"x} over { { {"sin"x} over {"cos"x} } \( sqrt {1+"sin"x} + sqrt {1 - "sin"x \) } } } = {"lim"} cSub { size 8{x rightarrow 0} } { {2"sin"x} over { { {"sin"x} over {"cos"x} } \( sqrt {1+"sin"x} + sqrt {1 - "sin"x \) } } } ={}} {}
(18)
=
lim
x
→
0
2
cos
x
1
+
sin
x
+
1
−
sin
x
=
2
1
+
1
=
2
2
=
1
=
lim
x
→
0
2
cos
x
1
+
sin
x
+
1
−
sin
x
=
2
1
+
1
=
2
2
=
1
size 12{ {}= {"lim"} cSub { size 8{x rightarrow 0} } { {2"cos"x} over { sqrt {1+"sin"x} + sqrt {1 - "sin"x} } } = { {2} over {1+1} } = { {2} over {2} } =1} {}
(19)22.
limx→01+xsinx−cos2xtan2x21+xsinx+cos2x1+xsinx+cos2x=limx→0(1+xsinx)2−(cos2x)2tan2x2(1+xsinx+cos2x)=limx→01+xsinx−cos2xtan2x21+xsinx+cos2x1+xsinx+cos2x=limx→0(1+xsinx)2−(cos2x)2tan2x2(1+xsinx+cos2x)= size 12{ {"lim"} cSub { size 8{x rightarrow 0} } { { sqrt {1+x"sin"x} - sqrt {"cos"2x} } over {"tan" rSup { size 8{2} } { {x} over {2} } } } { { sqrt {1+x"sin"x} + sqrt {"cos"2x} } over { sqrt {1+x"sin"x} + sqrt {"cos"2x} } } = {"lim"} cSub { size 8{x rightarrow 0} } { { \( sqrt {1+x"sin"x} \) rSup { size 8{2} } - \( sqrt {"cos"2x} \) rSup { size 8{2} } } over {"tan" rSup { size 8{2} } { {x} over {2} } \( sqrt {1+x"sin"x} + sqrt {"cos"2x} \) } } ={}} {}
=
lim
x
→
0
sin
2
x
+
cos
2
x
+
x
sin
x
−
cos
2
x
+
sin
2
x
sin
2
x
2
cos
2
x
2
(
1
+
x
sin
x
+
cos
2x
)
=
=
lim
x
→
0
sin
2
x
+
cos
2
x
+
x
sin
x
−
cos
2
x
+
sin
2
x
sin
2
x
2
cos
2
x
2
(
1
+
x
sin
x
+
cos
2x
)
=
size 12{ {}= {"lim"} cSub { size 8{x rightarrow 0} } { {"sin" rSup { size 8{2} } x+"cos" rSup { size 8{2} } x+x"sin"x - "cos" rSup { size 8{2} } x+"sin" rSup { size 8{2} } x} over { { {"sin" rSup { size 8{2} } { {x} over {2} } } over {"cos" rSup { size 8{2} } { {x} over {2} } } } \( sqrt {1+x"sin"x} + sqrt {"cos"2x} \) } } ={}} {}
(20)
=
lim
x
→
0
sin
x
(
2
sin
x
+
x
)
sin
2
x
2
cos
2
x
2
(
1
+
x
sin
x
+
cos
2x
)
=
lim
x
→
0
2
sin
x
2
cos
x
2
(
2
sin
x
+
x
)
sin
2
x
2
cos
2
x
2
(
1
+
x
sin
x
+
cos
2x
)
=
=
lim
x
→
0
sin
x
(
2
sin
x
+
x
)
sin
2
x
2
cos
2
x
2
(
1
+
x
sin
x
+
cos
2x
)
=
lim
x
→
0
2
sin
x
2
cos
x
2
(
2
sin
x
+
x
)
sin
2
x
2
cos
2
x
2
(
1
+
x
sin
x
+
cos
2x
)
=
size 12{ {}= {"lim"} cSub { size 8{x rightarrow 0} } { {"sin"x \( 2"sin"x+x \) } over { { {"sin" rSup { size 8{2} } { {x} over {2} } } over {"cos" rSup { size 8{2} } { {x} over {2} } } } \( sqrt {1+x"sin"x} + sqrt {"cos"2x} \) } } = {"lim"} cSub { size 8{x rightarrow 0} } { {2"sin" { {x} over {2} } "cos" { {x} over {2} } \( 2"sin"x+x \) } over { { {"sin" rSup { size 8{2} } { {x} over {2} } } over {"cos" rSup { size 8{2} } { {x} over {2} } } } \( sqrt {1+x"sin"x} + sqrt {"cos"2x} \) } } ={}} {}
(21)
=
lim
x
→
0
2
(
2
sin
x
+
x
)
1
+
x
sin
x
+
cos
2x
cos
x
2
sin
x
2
=
lim
x
→
0
2
cos
x
2
1
+
x
sin
x
+
cos
2x
(
4
sin
x
2
cos
x
2
sin
x
2
+
x
sin
x
2
)
=
=
lim
x
→
0
2
(
2
sin
x
+
x
)
1
+
x
sin
x
+
cos
2x
cos
x
2
sin
x
2
=
lim
x
→
0
2
cos
x
2
1
+
x
sin
x
+
cos
2x
(
4
sin
x
2
cos
x
2
sin
x
2
+
x
sin
x
2
)
=
size 12{ {}= {"lim"} cSub { size 8{x rightarrow 0} } { {2 \( 2"sin"x+x \) } over { sqrt {1+x"sin"x} + sqrt {"cos"2x} } } { {"cos" { {x} over {2} } } over {"sin" { {x} over {2} } } } = {"lim"} cSub { size 8{x rightarrow 0} } { {2"cos" { {x} over {2} } } over { sqrt {1+x"sin"x} + sqrt {"cos"2x} } } \( { {4"sin" { {x} over {2} } "cos" { {x} over {2} } } over {"sin" { {x} over {2} } } } + { {x} over {"sin" { {x} over {2} } } } \) ={}} {}
(22)
=
lim
x
→
0
2
cos
x
2
1
+
x
sin
x
+
cos
2x
(
4
cos
x
2
+
1
sin
x
2
2
⋅
x
2
)
=
2
2
(
4
+
2
)
=
6
=
lim
x
→
0
2
cos
x
2
1
+
x
sin
x
+
cos
2x
(
4
cos
x
2
+
1
sin
x
2
2
⋅
x
2
)
=
2
2
(
4
+
2
)
=
6
size 12{ {}= {"lim"} cSub { size 8{x rightarrow 0} } { {2"cos" { {x} over {2} } } over { sqrt {1+x"sin"x} + sqrt {"cos"2x} } } \( 4"cos" { {x} over {2} } + { {1} over { { {"sin" { {x} over {2} } } over {2 cdot { {x} over {2} } } } } } \) = { {2} over {2} } \( 4+2 \) =6} {}
(23)23.
limx→π4=cosx−sinxcos2x=limx→π4cosx−sinxcos2x−sin2x=limx→π4cosx−sinx(cosx−sinx)(cosx−sinx)=limx→π4=cosx−sinxcos2x=limx→π4cosx−sinxcos2x−sin2x=limx→π4cosx−sinx(cosx−sinx)(cosx−sinx)= size 12{ {"lim"} cSub { size 8{x rightarrow { {π} over {4} } } } = { {"cos"x - "sin"x} over {"cos"2x} } = {"lim"} cSub { size 8{x rightarrow { {π} over {4} } } } { {"cos"x - "sin"x} over {"cos" rSup { size 8{2} } x - "sin" rSup { size 8{2} } x} } = {"lim"} cSub { size 8{x rightarrow { {π} over {4} } } } { {"cos"x - "sin"x} over { \( "cos"x - "sin"x \) \( "cos"x - "sin"x \) } } ={}} {}
=
lim
x
→
π
4
1
cos
x
−
sin
x
=
1
cos
π
4
+
sin
π
4
=
1
2
2
+
2
2
=
1
2
⋅
2
2
=
2
2
=
lim
x
→
π
4
1
cos
x
−
sin
x
=
1
cos
π
4
+
sin
π
4
=
1
2
2
+
2
2
=
1
2
⋅
2
2
=
2
2
size 12{ {}= {"lim"} cSub { size 8{x rightarrow { {π} over {4} } } } { {1} over {"cos"x - "sin"x} } = { {1} over {"cos" { {π} over {4} } +"sin" { {π} over {4} } } } = { {1} over { { { sqrt {2} } over {2} } + { { sqrt {2} } over {2} } } } = { {1} over { sqrt {2} } } cdot { { sqrt {2} } over { sqrt {2} } } = { { sqrt {2} } over {2} } } {}
(24)24.
limx→01−cosxcos2xx21+cosxcos2x1+cosxcos2x=sin2x+cos2x−cos2x(cos2x−sin2x)x2(1+cosxcos2x)=limx→01−cosxcos2xx21+cosxcos2x1+cosxcos2x=sin2x+cos2x−cos2x(cos2x−sin2x)x2(1+cosxcos2x)= size 12{ {"lim"} cSub { size 8{x rightarrow 0} } { {1 - "cos"x sqrt {"cos"2x} } over {x rSup { size 8{2} } } } { {1+"cos"x sqrt {"cos"2x} } over {1+"cos"x sqrt {"cos"2x} } } = { {"sin" rSup { size 8{2} } x+"cos" rSup { size 8{2} } x - "cos" rSup { size 8{2} } x \( "cos" rSup { size 8{2} } x - "sin" rSup { size 8{2} } x \) } over {x rSup { size 8{2} } \( 1+"cos"x sqrt {"cos"2x \) } } } ={}} {}
=
lim
x
→
0
sin
2
x
+
cos
2
x
−
cos
4
x
+
sin
2
x
cos
2
x
x
(
1
+
cos
x
cos
2x
)
=
lim
x
→
0
sin
2
x
(
1
+
cos
2
x
)
+
cos
2
x
(
1
−
cos
x
)
x
2
(
1
+
cos
x
cos
2x
)
=
=
lim
x
→
0
sin
2
x
+
cos
2
x
−
cos
4
x
+
sin
2
x
cos
2
x
x
(
1
+
cos
x
cos
2x
)
=
lim
x
→
0
sin
2
x
(
1
+
cos
2
x
)
+
cos
2
x
(
1
−
cos
x
)
x
2
(
1
+
cos
x
cos
2x
)
=
size 12{ {}= {"lim"} cSub { size 8{x rightarrow 0} } { {"sin" rSup { size 8{2} } x+"cos" rSup { size 8{2} } x - "cos" rSup { size 8{4} } x+"sin" rSup { size 8{2} } x"cos" rSup { size 8{2} } x} over {x \( 1+"cos"x sqrt {"cos"2x \) } } } = {"lim"} cSub { size 8{x rightarrow 0} } { {"sin" rSup { size 8{2} } x \( 1+"cos" rSup { size 8{2} } x \) +"cos" rSup { size 8{2} } x \( 1 - "cos"x \) } over {x rSup { size 8{2} } \( 1+"cos"x sqrt {"cos"2x \) } } } ={}} {}
(25)
=
lim
x
→
0
sin
2
x
(
1
+
cos
2
x
)
+
cos
2
x
sin
2
x
x
2
(
1
+
cos
x
cos
2x
)
=
lim
x
→
0
sin
2
x
(
1
+
2
cos
2
x
)
x
2
(
1
+
cos
x
cos
2x
)
=
1
+
2
1
+
1
=
3
2
=
lim
x
→
0
sin
2
x
(
1
+
cos
2
x
)
+
cos
2
x
sin
2
x
x
2
(
1
+
cos
x
cos
2x
)
=
lim
x
→
0
sin
2
x
(
1
+
2
cos
2
x
)
x
2
(
1
+
cos
x
cos
2x
)
=
1
+
2
1
+
1
=
3
2
size 12{ {}= {"lim"} cSub { size 8{x rightarrow 0} } { {"sin" rSup { size 8{2} } x \( 1+"cos" rSup { size 8{2} } x \) +"cos" rSup { size 8{2} } x"sin" rSup { size 8{2} } x} over {x rSup { size 8{2} } \( 1+"cos"x sqrt {"cos"2x \) } } } = {"lim"} cSub { size 8{x rightarrow 0} } { {"sin" rSup { size 8{2} } x \( 1+2"cos" rSup { size 8{2} } x \) } over {x rSup { size 8{2} } \( 1+"cos"x sqrt {"cos"2x \) } } } = { {1+2} over {1+1} } = { {3} over {2} } } {}
{}
25.
limx→Bsin2x−sin2Bx2−B2=limx→B(sinx−sinB)(sinx+sinB)(x−B)(x+B)=limx→Bsinx+B(x+B)=sin2B2Blimx→Bsin2x−sin2Bx2−B2=limx→B(sinx−sinB)(sinx+sinB)(x−B)(x+B)=limx→Bsinx+B(x+B)=sin2B2B size 12{ {"lim"} cSub { size 8{x rightarrow B} } { {"sin" rSup { size 8{2} } x - "sin" rSup { size 8{2} } B} over {x rSup { size 8{2} } - B rSup { size 8{2} } } } = {"lim"} cSub { size 8{x rightarrow B} } { { \( "sin"x - "sin"B \) \( "sin"x+"sin"B \) } over { \( x - B \) \( x+B \) } } = {"lim"} cSub { size 8{x rightarrow B} } { {"sin"x+B} over { \( x+B \) } } = { {"sin"2B} over {2B} } } {}
26.
limx→02arcsinx3x=limx→02t3sint=23⋅limx→01sintt=23limx→02arcsinx3x=limx→02t3sint=23⋅limx→01sintt=23 size 12{ {"lim"} cSub { size 8{x rightarrow 0} } { {2"arcsin"x} over {3x} } = {"lim"} cSub { size 8{x rightarrow 0} } { {2t} over {3"sin"t} } = { {2} over {3} } cdot {"lim"} cSub { size 8{x rightarrow 0} } { {1} over { { {"sin"t} over {t} } } } = { {2} over {3} } } {}
смена:
sint=x,x→0⇒t→0sint=x,x→0⇒t→0 size 12{"sin"t=x,~x rightarrow 0 drarrow t rightarrow 0} {}
