Question: Let 2,400 be consecutive terms of an arithmetic with common difference d, and let W1, W2, W00 be consecutive terms of another arithmetic progression

Let 2,400 be consecutive terms of an arithmetic with common difference d,

Let 2,400 be consecutive terms of an arithmetic with common difference d, and let W1, W2, W00 be consecutive terms of another arithmetic progression with common difference d, where did = 10. For each i = 1, 2, ...., 100, let R; be a rectangle with length 1, width w; and area 4. If A51 - 450 = 1000, then the value of 4100-490 is

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