P AM
SP AM
SP AM
SP AM
SP AM
SP AM
SP AM
SP AM
SP AM
SP AM
SP AM
SP AM
SP AM
SP AM
SP AM
SP AM
SP AM
SP AM
SP AM
SPAM
SAM
AM
AMP
AMSP
AM SP
AM SP
AM SP
AM SP
AM SP
AM SP
AM SP
AM SP
AM SP
AM SP
AM SP
AM SP
AM SP
AM SP
AM SP
AM SP
AM SP
AM SP
AM SP
AMSP
ASP
SP
SPM
SPAM
SP AM
SP AM
SP AM
SP AM
SP AM
SP AM
SP AM
SP AM
SP AM
SP AM
SP AM
SP AM
SP AM
SP AM
SP AM
SP AM
SP AM
SP AM
SP AM
SPAM
SAM
AM
AMP
AMSP
AM SP
AM SP
AM SP
AM SP
AM SP
AM SP
AM SP
AM SP
AM SP
AM SP
AM SP
AM SP
AM SP
AM SP
AM SP
AM SP
AM SP
AM SP
AM SP
AMSP
ASP
SP
SPM
SPAM
SPAM
SPAM
SPAM
SPAM
SPAM
SPAM
SPAM
SPAM
SPAM
SPAM
SPAM
SPAM
SPAM
SPAM
SPAM
SPAM
SPAM
SPAM
SPAM
SPAM
SPAM
SPAM
SPAM
SPAM
SPAM
SPAM
SPAM
SPAM
SPAM
SPAM
SPAM
SPAM
SPAM
SPAM
SPAM
SPAM
SPAM
SPAM
SPAM
SPAM
SPAM
SPAM
SPAM
SPAM
Must Waste More Time...
По теореме Виета сумма корней уравнения ax² + bx + c = 0 равна x₁ + x₂ = - b/a. Т. к. у нас b = -6, a = 8. то x₁ + x₂ = 6/8 = 3/4. Отсюда x₂ = 3/4 - x₁. По условию x₁ = x₂² => x₁ = (3/4 - x₁)², следовательно (3/4 - x₁)² - x₁ = 0 => 9/16 - (3/2)x₁ + x₁² - x₁ = 0 => (16x₁² - 24x₁ - 16x₁ + 9)/16 = 0 => 16x₁² - 40x₁ + 9 = 0. Находим дискриминант D = 1600 - 16*36 = 1600 - 576 = 1024. Его корни будут x₁ = (40 +√1024)/32 = (40 + 32)/32 = 72/32 = 9/4 и x₁ = (40 - √1024)/32 = (40 - 32)/32 = 8/32 = 1/4. Тогда второй корень x₂ = 3/4 - 1/4 = 2/4 = 1/2. Подставляя этот корень в уравнение, находим значение параметра a: 8x² - 6x + 9a² = 0 => 8/4 - 6/2 + 9a² = 0 => 9a² + 2 - 3 = 0 => 9a² - 1 = 0 => 9a² = 1 => a² = 1/9 => a = +1/3 и a = -1/3. Т. к. ищется положительное значение a, то a = 1/3.
ответ: a = 1/3.