【极限符号省略不写】
原式= [√(2x+1) -3] / [(x+1)(x-4)]
=[√(2x+1) -3][√(2x+1) +3] / [√(2x+1) +3][(x+1)(x-4)]
= [(2x+1) - 9] / [√(2x+1) +3][(x+1)(x-4)]
= (2x-8) / [√(2x+1) +3][(x+1)(x-4)]
= 2 / [√(2x+1) +3](x+1)
= 1/15
1.lim(x->4)(2x+1)^1/2-3/x^2-3x-4
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