求解第3和第4题
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求解第3和第4题求解第3和第4题 求解第3和第4题(3)因a与b均为非零实数,故(asinπ/5+bcosπ/5)/(acosπ/5-bsinπ/5)两边均除以cosπ/5=(atanπ/5
求解第3和第4题
求解第3和第4题
求解第3和第4题
(3)
因a与b均为非零实数,故
(asinπ/5+bcosπ/5)/(acosπ/5-bsinπ/5) 两边均除以cosπ/5
=(atanπ/5+b)/(a-btanπ/5) 两边均除以a
=(b/a+tanπ/5)/(1-b/atanπ/5)
={tan[arctan(b/a)]+tanπ/5}/{1-tan[arctan(b/a)]*tanπ/5}
=tan[arctan(b/a)+tanπ/5]=tan(8π/15)
arctan(b/a)+π/5=8π/15+kπ
arctan(b/a)=π/3+kπ
tan[arctan(b/a)]=tan(π/3+kπ)
b/a=√3
(4)
f(x)=sin平方x+acosx-(1\2a)-3\2=1-cosx平方+acosx-(1\2a)-3\2
=-cosx平方+acosx-(1\2a)-1\2
最大值为a平方的四分之一-(1\2a)-1\2=1
a=1正负根号7