設(shè)a���,b為常數(shù),M{f(x)|f(x)=acosx+bsinx};F:把平面上任意一點(diǎn)(a,b)映射為函數(shù)acodx+bsinx.
(1)證明:不存在兩個(gè)不同點(diǎn)對(duì)應(yīng)于同一個(gè)函數(shù);
(2)證明:當(dāng)f0(x)ÎM時(shí)���,f1(x)=f0(x+t)ÎM���,這里t為常數(shù)���;
(3)對(duì)于屬于M的一個(gè)固定值f0(x)���,得M1={f0(
答案:
解析:
| (1)證明:假設(shè)有兩個(gè)不同的點(diǎn)(a���,b),(c���,d)對(duì)應(yīng)同一函數(shù)���,即F(a���,b)=acosx+bsinx與F(c���,d)=ccosx+dsinx相同,即acosx+bsinx=ccosx+dsinx對(duì)于一切實(shí)數(shù)x成立.令x=0���,得a=c;令 ,得b=d這與(a,b),(c���,d)是兩個(gè)不同點(diǎn)矛盾���,設(shè)不成立.故不存在兩個(gè)不同點(diǎn)對(duì)應(yīng)同函數(shù).
(2)證明:當(dāng)f0(x)ÎM時(shí),可得常數(shù)a0,b0���,即f0(x)=a0cosx+b0sinx���,
f1(x)=f0(x+t)=a0cos(x+t)+b0sin(x+t)=(a0cost+b0sint)cosx+(b0cost-a0sint)sinx,因?yàn)?/span>a0,a0���,t為常數(shù)���,設(shè)a0cost+b0sint=m���,b0cost-a0sint=n,則m���,n是常數(shù).所以f1(x)=mcosx+nsinxÎM
(3)解:當(dāng)f0(x)Î����M時(shí)���,由此得f0(x+t)=mcosx+nsinx���,其中m=a0cost+b0sint���,n=b0cost-a0sint���,在映射F之下���,f0(x+t)的原象是(m,n),則M1的原象是{(m���,n)|m=a0cost+b0sint���,n=b0cost-a0sint,tÎR}.消去t得 ���,即在映射F之下���,M1的原象{(m���,n)|m2+n2= <����span
style='mso-char-type:symbol;mso-symbol-font-family:Symbol'>}是以原點(diǎn)為圓心���, 為半徑的圓.
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