第1个回答 2020-10-18
用等价无穷小
1-cosx~1/2x^2
原式=x^2/(1/2x^2)=2
1-cosx~1/2x^2
原式=x^2/(1/2x^2)=2
第2个回答 2020-10-18
x→0时,sinx∽x
方法一:
0/0型,运用洛必达法则
lim(x→0) x²/(1–cosx)
=lim(x→0) 2x/sinx
=2
方法二:
lim(x→0) x²/(1–cosx)
=lim(x→0) x²/[2sin²(x/2)]
=lim(x→0) x²/[2·(x/2)²]
=2
方法三:
在x=0处,cosx带皮亚诺余项的泰勒展开为
cosx=1–x²/2+x^4/4!+o(x^4)
=1–x²/2+o(x²)
lim(x→0) x²/(1–cosx)
=lim(x→0) x²/[1–(1–x²/2+o(x²))]
=lim(x→0) 1/(1/2)
=2本回答被网友采纳
方法一:
0/0型,运用洛必达法则
lim(x→0) x²/(1–cosx)
=lim(x→0) 2x/sinx
=2
方法二:
lim(x→0) x²/(1–cosx)
=lim(x→0) x²/[2sin²(x/2)]
=lim(x→0) x²/[2·(x/2)²]
=2
方法三:
在x=0处,cosx带皮亚诺余项的泰勒展开为
cosx=1–x²/2+x^4/4!+o(x^4)
=1–x²/2+o(x²)
lim(x→0) x²/(1–cosx)
=lim(x→0) x²/[1–(1–x²/2+o(x²))]
=lim(x→0) 1/(1/2)
=2本回答被网友采纳
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