16.求函數(shù)y=$\sqrt{x+1}$+$\sqrt{1-x}$+2$\sqrt{1-{x}^{2}}$的值域.
分析 由題意設(shè)$\sqrt{x+1}$=$\sqrt{2}$sina��,$\sqrt{1-x}$=$\sqrt{2}$cosa,(0≤a≤$\frac{π}{2}$)���,從而可得故y=$\sqrt{2}$t+2t2-2=2(t+$\frac{\sqrt{2}}{4}$)2-$\frac{9}{4}$,從而解得.
解答 解:∵($\sqrt{x+1}$)2+($\sqrt{1-x}$)2=2��,
∴設(shè)$\sqrt{x+1}$=$\sqrt{2}$sina����,$\sqrt{1-x}$=$\sqrt{2}$cosa,(0≤a≤$\frac{π}{2}$)����,
則$\sqrt{1-{x}^{2}}$=$\sqrt{x+1}$•$\sqrt{1-x}$=2sinacosa,
則y=$\sqrt{x+1}$+$\sqrt{1-x}$+2$\sqrt{1-{x}^{2}}$
=$\sqrt{2}$sina+$\sqrt{2}$cosa+4sinacosa
=$\sqrt{2}$(sina+cosa)+4sinacosa����,
令sina+cosa=t(1$≤t≤\sqrt{2}$),則sinacosa=$\frac{{t}^{2}-1}{2}$,
故y=$\sqrt{2}$t+2t2-2=2(t+$\frac{\sqrt{2}}{4}$)2-$\frac{9}{4}$��,
∵1$≤t≤\sqrt{2}$�,
∴$\sqrt{2}$≤2(t+$\frac{\sqrt{2}}{4}$)2-$\frac{9}{4}$≤4;
故函數(shù)y=$\sqrt{x+1}$+$\sqrt{1-x}$+2$\sqrt{1-{x}^{2}}$的值域為[$\sqrt{2}$���,4].
點評 本題考查了換元法的應(yīng)用及三角函數(shù)的應(yīng)用���,屬于基礎(chǔ)題.
