From the information obtained from the question, two equations can be created:
Let x and z be the two numbers (parts)
[tex] \frac{1}{z} + \frac{1}{x} = \frac{3}{10} [/tex] . . . . (1)
[tex]z + x = 15[/tex] . . . . (2)
By transposing (2), make 'z' the subject of the equation
[tex]z = 15 - x[/tex] . . . . (3)
By substituting (3) into equation (1) to find a value for x
[tex]\frac{1}{(15 - x)} + \frac{1}{x} = \frac{3}{10}[/tex]
[tex] \frac{15}{( 15 - x ) ( x )} = \frac{3}{10} [/tex]
[tex]3 ( - x^{2} + 15 x ) = 150[/tex]
[tex]3 x^{2} - 45x + 150 = 0[/tex]
⇒ [tex]( x - 5 ) ( x - 10 ) = 0[/tex]
∴ either [tex]( x - 5) = 0[/tex] OR [tex]( x - 10 ) = 0[/tex]
Thus x = 5 or x = 10
By substituting the values of x into (2) to find z
z + (5) = 15 OR z + (10) = 15
⇒ z = 10 OR z = 5
So, the two numbers or two parts into which fifteen is divided to yield the desired results are 5 and 10.
