Объяснение:
f'x = (ctg(x^2 × y))' = -1/(sin^2 (x^2 × y)) × (x^2×y)' = -1/(sin^2 (x^2 × y)) × 2 × x × y = - (2×x×y) / (sin^2 (x^2 × y))
f'y = ctg(x^2 × y))' = -1/(sin^2 (x^2 × y)) × (x^2×y)' = -1/(sin^2 (x^2 × y)) × x^2 = -(x^2) / (sin^2 (x^2 × y))
f"xx = ( -(2×x×y) / (sin^2 (x^2 × y)) )' = - (2×x×y)' × 1/ (sin^2 (x^2 × y)) - (2×x×y) × (1/(sin^2 (x^2 × y)))' = - (2×y) / (sin^2 (x^2 × y)) - (2×x×y) × ( -2/(sin^3 (x^2 ×y)) ) × cos(x^2 × y) × 2 × x × y = - (2×y) / (sin^2 (x^2 × y)) + (8×x^2×y^2) × (1/(sin^3 (x^2 ×y)) ) × cos(x^2 × y) = - (2×y) / (sin^2 (x^2 × y)) + ( 8×x^2×y^2 × cos(x^2 × y) ) / (sin^3 (x^2 ×y))
f"yy = (-(x^2) / (sin^2 (x^2 × y)))' = -(x^2) × (-2) × (sin^(-3) (x^2 × y)) × cos (x^2 × y) × x^2 = ( 2 × x^4 × cos (x^2 × y) ) / (sin^3 (x^2 × y))
f"xy = f"yx = - (2×x) / (sin^2 (x^2 × y)) - (2×x×y) / (sin^3 (x^2 × y)) × (-2 × cos(x^2×y) × x^2) = - (2×x) / (sin^2 (x^2 × y)) + 4 (x^3 × y × cos(x^2×y)) / (sin^3 (x^2 × y))
5^(x-2) = 5^0 2^(x² -3x +8) = 2^6
x-2 = 0 x² -3x +8 = 6
x = 2 x² -3x +2 = 0
2) 3·4^x =48 x = 1 и х = 2
4^x = 16 6)7^(2x-8)·7^(x+7) = 0
4^x = 4² нет решений
x=2 7)(0,2)^x ≤ 25·5√5
3)3^x=27·3√9 5^-x ≤ 5²·5·5^1/2
3^x = 3³·3·3 5^-x ≤5^3,5
3^x = 3^5 -x ≤ 3,5
x = 5 x ≥ -3,5
4)3^x + 3^(x +1) = 4 8)(1/2)^-x + 2^(3 +x) ≤9
3^x(1 +3) = 4 2^x +2^(3 +x) ≤ 9
3^x·4 = 4 2^x(1 +2^3) ≤ 9 | :9
3^x = 1 2^x ≤ 1
x = 0 2^x ≤2^0
x≤ 0
Объяснение:
f'x = (ctg(x^2 × y))' = -1/(sin^2 (x^2 × y)) × (x^2×y)' = -1/(sin^2 (x^2 × y)) × 2 × x × y = - (2×x×y) / (sin^2 (x^2 × y))
f'y = ctg(x^2 × y))' = -1/(sin^2 (x^2 × y)) × (x^2×y)' = -1/(sin^2 (x^2 × y)) × x^2 = -(x^2) / (sin^2 (x^2 × y))
f"xx = ( -(2×x×y) / (sin^2 (x^2 × y)) )' = - (2×x×y)' × 1/ (sin^2 (x^2 × y)) - (2×x×y) × (1/(sin^2 (x^2 × y)))' = - (2×y) / (sin^2 (x^2 × y)) - (2×x×y) × ( -2/(sin^3 (x^2 ×y)) ) × cos(x^2 × y) × 2 × x × y = - (2×y) / (sin^2 (x^2 × y)) + (8×x^2×y^2) × (1/(sin^3 (x^2 ×y)) ) × cos(x^2 × y) = - (2×y) / (sin^2 (x^2 × y)) + ( 8×x^2×y^2 × cos(x^2 × y) ) / (sin^3 (x^2 ×y))
f"yy = (-(x^2) / (sin^2 (x^2 × y)))' = -(x^2) × (-2) × (sin^(-3) (x^2 × y)) × cos (x^2 × y) × x^2 = ( 2 × x^4 × cos (x^2 × y) ) / (sin^3 (x^2 × y))
f"xy = f"yx = - (2×x) / (sin^2 (x^2 × y)) - (2×x×y) / (sin^3 (x^2 × y)) × (-2 × cos(x^2×y) × x^2) = - (2×x) / (sin^2 (x^2 × y)) + 4 (x^3 × y × cos(x^2×y)) / (sin^3 (x^2 × y))