公式:tan2α=2tanα/(1+tan²α)
所以 tanπ/12+1/tanπ/12
=[tan²(π/12)+1]/tan(π/12)
=2*{[tan²(π/12)+1]/[2tan(π/12)]}
=2*1/tan[2*(π/12)]
=2/tan(π/6)
=2√3
公式:tan2α=2tanα/(1+tan²α)
所以 tanπ/12+1/tanπ/12
=[tan²(π/12)+1]/tan(π/12)
=2*{[tan²(π/12)+1]/[2tan(π/12)]}
=2*1/tan[2*(π/12)]
=2/tan(π/6)
=2√3