A perturbed Cantor set (without the uniform boundedness condition away from zero of contraction ratios) whose upper Cantor
dimension and lower Cantor dimension coincide has its Hausdorff dimension of the same value of Cantor dimensions. We will
show this using an energy theory instead of Frostman's density lemma which was used for the case of the perturbed Cantor set
with the uniform boundedness condition. At the end, we will give a nontrivial example of such a perturbed Cantor set.