นิพจน์ 13: "d" equals "N" StartFraction, "H" plus 1 minus "P" Over "H" plus 1 , EndFractiond=NH+1−PH+1
equals=
1212
13
animation
ซ่อนโฟลเดอร์นี้จากนักเรียน
14
นิพจน์ 15: left parenthesis, "A" cos "t" , "B" sin "t" , right parenthesisAcost,Bsint
00
โดเมน t ค่าต่ำสุด:
less than or equal to "t" less than or equal to≤t≤
โดเมน t ค่าสูงสุด: 2 pi2π
15
นิพจน์ 16: left parenthesis, "A" cos "t" , "B" sin "t" , right parenthesis minus StartFraction, "N" Over StartRoot, left parenthesis, "B" cos "t" , right parenthesis squared plus left parenthesis, "A" sin "t" , right parenthesis squared , EndRoot , EndFraction left parenthesis, "B" cos "t" , "A" sin "t" , right parenthesis plus "d" times left parenthesis, cos left parenthesis, "t" StartFraction, "M" minus "N" Over "N" , EndFraction , right parenthesis , negative sin left parenthesis, "t" StartFraction, "M" minus "N" Over "N" , EndFraction , right parenthesis , right parenthesisAcost,Bsint−NBcost2+Asint2Bcost,Asint+d·costM−NN,−sintM−NN
00
โดเมน t ค่าต่ำสุด:
less than or equal to "t" less than or equal to≤t≤
โดเมน t ค่าสูงสุด: "T"T
16
นิพจน์ 17: left parenthesis, "A" cos "T" , "B" sin "T" , right parenthesis minus StartFraction, "N" Over StartRoot, left parenthesis, "B" cos "T" , right parenthesis squared plus left parenthesis, "A" sin "T" , right parenthesis squared , EndRoot , EndFraction left parenthesis, "B" cos "T" , "A" sin "T" , right parenthesis plus "N" times left parenthesis, cos "t" , sin "t" , right parenthesisAcosT,BsinT−NBcosT2+AsinT2BcosT,AsinT+N·cost,sint
โดเมน t ค่าต่ำสุด: 00
less than or equal to "t" less than or equal to≤t≤
โดเมน t ค่าสูงสุด: 2 pi2π
17
ซ่อน ป้ายกำกับ left parenthesis, "A" cos "T" , "B" sin "T" , right parenthesis minus StartFraction, "N" Over StartRoot, left parenthesis, "B" cos "T" , right parenthesis squared plus left parenthesis, "A" sin "T" , right parenthesis squared , EndRoot , EndFraction left parenthesis, "B" cos "T" , "A" sin "T" , right parenthesis plus "d" times left parenthesis, cos left parenthesis, "T" StartFraction, "M" minus "N" Over "N" , EndFraction , right parenthesis , negative sin left parenthesis, "T" StartFraction, "M" minus "N" Over "N" , EndFraction , right parenthesis , right parenthesisAcosT,BsinT−NBcosT2+AsinT2BcosT,AsinT+d·cosTM−NN,−sinTM−NN
ป้ายกำกับ
18
นิพจน์ 19: left parenthesis, "A" cos "t" , "B" sin "t" , right parenthesis plus StartFraction, "N" Over StartRoot, left parenthesis, "B" cos "t" , right parenthesis squared plus left parenthesis, "A" sin "t" , right parenthesis squared , EndRoot , EndFraction left parenthesis, "B" cos "t" , "A" sin "t" , right parenthesis minus "d" times left parenthesis, cos left parenthesis, "t" StartFraction, "M" plus "N" Over "N" , EndFraction , right parenthesis , sin left parenthesis, "t" StartFraction, "M" plus "N" Over "N" , EndFraction , right parenthesis , right parenthesisAcost,Bsint+NBcost2+Asint2Bcost,Asint−d·costM+NN,sintM+NN
00
โดเมน t ค่าต่ำสุด:
less than or equal to "t" less than or equal to≤t≤
โดเมน t ค่าสูงสุด: "T"T
19
นิพจน์ 20: left parenthesis, "A" cos "T" , "B" sin "T" , right parenthesis plus StartFraction, "N" Over StartRoot, left parenthesis, "B" cos "T" , right parenthesis squared plus left parenthesis, "A" sin "T" , right parenthesis squared , EndRoot , EndFraction left parenthesis, "B" cos "T" , "A" sin "T" , right parenthesis plus "N" times left parenthesis, cos "t" , sin "t" , right parenthesisAcosT,BsinT+NBcosT2+AsinT2BcosT,AsinT+N·cost,sint
00
โดเมน t ค่าต่ำสุด:
less than or equal to "t" less than or equal to≤t≤
โดเมน t ค่าสูงสุด: 2 pi2π
20
ซ่อน ป้ายกำกับ left parenthesis, "A" cos "T" , "B" sin "T" , right parenthesis plus StartFraction, "N" Over StartRoot, left parenthesis, "B" cos "T" , right parenthesis squared plus left parenthesis, "A" sin "T" , right parenthesis squared , EndRoot , EndFraction left parenthesis, "B" cos "T" , "A" sin "T" , right parenthesis minus "d" times left parenthesis, cos left parenthesis, "T" StartFraction, "M" plus "N" Over "N" , EndFraction , right parenthesis , sin left parenthesis, "T" StartFraction, "M" plus "N" Over "N" , EndFraction , right parenthesis , right parenthesisAcosT,BsinT+NBcosT2+AsinT2BcosT,AsinT−d·cosTM+NN,sinTM+NN