Using the power rule, f'(x) = 12x^3 - 10x.

Using the power rule, f'(x) = 12x^3 - 15x^2 + 2.

Using the power rule, f'(x) = -4/x^2.

Using the power rule, f'(x) = 10x - 4.

The derivative f'(x) = 15x^2 - 2.

Using the power rule, f'(x) = 25x^4 - 3.

Using the power rule, f'(x) = 14x + 2.

Using the product rule, f'(x) = e^x * ln(x) + e^x * (1/x) = e^x * (ln(x) + 1/x).

Using the product rule, f'(x) = e^x * x^2 + e^x * 2x = e^x * (x^2 + 2x).

The derivative f'(x) = d/dx(ln(x)) = 1/x.

Using the product rule, f'(x) = 2x * sin(x) + x^2 * cos(x).

Using the product rule, f'(x) = 3x^2 * e^x + x^3 * e^x.

Using the product rule, f'(x) = 3x^2 * ln(x) + x^2.

Using the power rule, f'(x) = 3x^2 - 4.

The derivative f'(x) = 3x^2 - 12x + 9.

Using the power rule, f'(x) = 4x^3 - 12x.

The derivative f'(x) = d/dx(3x^2 + 5x - 7) = 6x + 5.

The determinant of a 1x1 matrix is simply the value of the single element. Therefore, the determinant of [[5]] is 5.

The determinant of a 2x2 matrix is calculated as ad - bc.

The determinant of a 2x2 matrix is calculated as ad - bc.

The determinant of E is 0 because the rows are linearly dependent.

The determinant can be calculated using the formula for 3x3 matrices. Here, the first column is the same, leading to a determinant of 0.

The determinant is 0 because the first column is a linear combination of the other columns.

Det(J) = (5*8) - (6*7) = 40 - 42 = -2.

For the equation y^2 = 4px, p = 5. The directrix is given by x = -p, which is x = -5.

Using the distance formula: d = √[(3 - 0)² + (4 - 0)²] = √[9 + 16] = √25 = 5.

Using the distance formula: d = √((8 - 0)² + (6 - 0)²) = √(64 + 36) = √100 = 10.

Using the distance formula: d = √[(3 - 0)² + (4 - 0)²] = √[9 + 16] = √25 = 5.

Using the distance formula: d = √[(6 - 2)² + (7 - 3)²] = √[16 + 16] = √32 = 4√2 ≈ 5.66.

Using the distance formula: d = √[(3 - 3)² + (-2 - 2)²] = √[0 + 16] = √16 = 4.