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Abstract: In this paper, by using elliptic curves theory, we study the quartic Diophantine equation (DE) n i=1 a i x 4 i = n j=1 a j y 4 j , where a i and n ≥ 3 are fixed arbitrary integers. We try to transform this quartic to a cubic elliptic curve of positive rank. We solve the equation for some values of a i and n = 3, 4, and find infinitely many nontrivial solutions for each case in natural numbers, and show among other things, how some numbers can be written as sums of three, four, or more biquadrates in two differ… Show more