4^(x-3) - 71*2^(x-6) + 7 ≤ 0
2^(2x-6) - 71*2^(x-6) + 7 ≤ 0
(1/64)*2^(2x) - (71/64)*2^(x) + 7 ≤ 0
Замена: 2^(x) = t > 0
(1/64)*t^2 - (71/64)*t + 7 ≤ 0
t^2 - 71t + 448 ≤ 0
D = 3249 = 57^2
t1 = (71-57)/2 = 7 > 0
t2 = (71+57)/2 = 64 > 0
7 ≤ t ≤ 64
7 ≤ 2^x ≤ 64
log2(7) ≤ x ≤ 6
1) (a+3)²-(a-2)(a+2) =а^2+6а+9-а^2+4=6а+13
a=3,5
6а+13=6*3,5+13=21+13=34
2) (5a-10)²-(3a-8)²+132a =25а^2-100а+100-9а^2+48а-64+132а=
=16а^2+80а+36
a=-6
16а^2+80а+36=16*(-6)^2+80*(-6)+36=
=576-480+36=132
Решение смотри в приложении