Question 83093
LET THE NUMBER BE "X".


Hence, the given number can be written as:  


{{{ (3/5)x > (2/3)}}} 


Here, we are supposed to find the integer that satifies the given inequality. 


when mwe plug x = 1 in the above equation, we get the 0.6 > 0.667  which is not possible.. 


Hence, we plug in the next preceeding value. 


Lets plug x = 2 in the above inequality. 


{{{(3/5)(2) > (2/3)}}}  Which gives us 1.2 > 0.667 


Hence this satifies the given inequality. 


When x = 3 then the value again changes. Hence, we get:  1.8 >  0.667 This again satisfies the inequality. 


This shows us that as the value of x increases, the value on the left hand side keeps on increasing.. Hence, 2 would be the lowest minimum number that can be plugged for x. 



Thus, the solution.


Regards