Explanation

Let the total number of marbles be x

No of gold-plated marbles, = 3, No of diamond marbles, = 4

No of silver marble = x - 3 - 4 = (x - 7)

Pr(both were silver) = \(\frac{(x - 7)}{x}\) x \(\frac{(x - 8)}{(x - 1)}\) ( since selection is without replacement will affect the second pick)

=  \(\frac{(x - 7)}{x}\) x \(\frac{(x - 8)}{(x - 1)}\) =  \(\frac{1}{15}\)

\(\frac{(x^2 - 15x + 56 )}{(x^2 - x) }\) =  \(\frac{1}{15}\),

           cross multiply

 = 15x\(^2\) - 225x + 840 = x\(^2\) - x 

 = 14x\(^2\) - 224x + 840 = 0

     Divide through by 14

 = x\(^2\) - 16x + 60 = 0 

= x\(^2\) - 10x - 6x + 60 = 0

= x(x - 10) - 6(x - 10) = 0 

= (x - 10)(x - 6) = 0

= x = 6 or 10

x = 10 ( total marble should not be less than the sum of both gold and diamond marbles)

Recall, Silver marbles = x - 7 = 10 - 7 = 3

THEREFORE, the number of silver marbles = 3.

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