the surface area of a square pyramid with base length b and slant height x is
[tex]A=b^2+2bx[/tex]
note that b²=base area
so, if we say that her original pyramid's surface area is [tex]A_1=b^2+2bx[/tex], then the new one has a slant height of twice that, ie, we replace x with 2x and see what happens
[tex]A_2=b^2+2b(2x)[/tex]
[tex]A_2=b^2+4bx[/tex]
if we try to work [tex]A_1[/tex] back into there
[tex]A_2=b^2+2bx+2bx[/tex]
[tex]A_2=(b^2+2bx)+2bx[/tex]
[tex]A_2=A_1+2bx[/tex]
see our options
option 1 is wrong since the surface area increased by 2bx
option 2 is wrong since the surface area increased by 2bx, also we do use the slant height when finding surface area
option 3 is wrong because we got [tex]A_2=A_1+2bx[/tex] and not [tex]A_2=2(A_1)[/tex]
option 4 is correct since the new surface area is greater than the original by 2bx
answer is option 4
