Given,
S={4,6,9}&T={9,10,11\ldots ..1000}
Also given A{{a}_{1}+{a}_{2}+\ldots ..+{a}_{k}:K\in N}&{a}_{i}\in S
Now here by the definition of set 'A'
A=a:a=4x+6y+9z
Now checking number we will get from equation a=4x+6y+9z
Put x=y=0&z=1 we get a=9
Put x=y=1&z=0 we get a=10
Put x=0,y=2&z=0 we get a=12
Put x=1,y=0&z=1 we get a=13
Put x=2,y=1&z=o we get a=14
Put x=0,y=1&z=1 we get a=15
...
Put x=1,y=1&z=1 we get a=19
Now from 20 onwards we get all number as all number will be of type 4k,4k+1,4k+2&4k+3 and from equation 1,2&3 remainder get compensated by combination of 6y and 9z,
So, except the element 11, every element of set T is of the form 4x+6y+9z for some x,y,z∈W
∴T−A=11