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I wonder that, I made these observations from my previous study on product of consecutive integers. I am looking the solutions of these kind of equations.

$(1)$ Is $x(x+1)(x+2)...(x+[\text{any-odd-integer}]) = y^2$ has solutions or not?. If exits, how to list them?

$(2)$ Is $x(x+d)(x+2d) = y^2$ has infinitely many solutions or not? If there, how to find them.

$(3)$ For $k \ne 2,4$, can we have solutions of $x(x+1)(x+2)...(x+k-1)+Q = t^2$, where Q is a rational number.

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    Related: http://math.stackexchange.com/questions/33338/product-of-consecutive-integers-is-not-a-power2012-12-24

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One can find infinitely many $d$, $x$, and $y$ such that $x(x+d)(x+2d)=y^2$. Let $w=x+d$. Then we are looking for integers $d$, $w$, and $y$ such that $w(w^2-d^2)=y^2$. Let $(d,t,w)$ be a Pythagorean triple such that $w$ is a perfect square. There are infinitely many such Pythagorean triples.

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    It is a type of problem that is notoriously difficult. The result of Erdos was itself not simple to prove, and your question (3) is a large order of magnitude harder, since it mixes multiplication and addition.2012-12-24