>>551
>>542
a=√(4-4t+3t^2)/1-t+t^2
=√(4-4t+3t^2)×{1/(1-t+t^2)}
aを√(4-4t+3t^2)と1/(1-t+t^2)の積とみなして微分すると、
a'={(6t-4)/2√(4-4t+3t^2)}(1-t+t^2)+{√(4-4t+3t^2)}(2t-1)
={(3t-2)/√(4-4t+3t^2)}(1-t+t^2)+{√(4-4t+3t^2)}(2t-1)
={(3t-2)(1-t+t^2)/√(4-4t+3t^2)+(4-4t+3t^2)(2t-1)/√(4-4t+3t^2)
a'の分子=(3t-2)(1-t+t^2)+(4-4t+3t^2)(2t-1)
=3t(1-t+t^2)-(1-t+t^2)+(2t(4-4t+3t^2)-(4-4t+3t^2)
=3t-3t^2+3t^3-1+t-t^2+8t-8t^2+6t^3-4+4t-3t^2
=9t^3-15t^2+16t-5
=0 計算間違いでしょうか?