9. \( 3 t^{8} \) 13. \( \sqrt{7} n^{4} \) 13. \( 6 c^{2}+2 c^{4}-c \) \( \begin{array}{l}\text { 14. } 8 d-2-4 d^{3}\end{array} \)

Simplify the expression by following steps: - step0: Solution: \(\sqrt{7}\times n^{4}\) Calculate or simplify the expression \( 6*c^2 + 2*c^4 - c \). Simplify the expression by following steps: - step0: Solution: \(6c^{2}+2c^{4}-c\) Calculate or simplify the expression \( 3*t^8 \). Simplify the expression by following steps: - step0: Solution: \(3t^{8}\) Calculate or simplify the expression \( 8*d - 2 - 4*d^3 \). Simplify the expression by following steps: - step0: Solution: \(8d-2-4d^{3}\) Here are the simplified forms of the given expressions: 1. For \( 3 t^{8} \): - The expression remains \( 3t^{8} \). 2. For \( \sqrt{7} n^{4} \): - The expression remains \( \sqrt{7} \times n^{4} \). 3. For \( 6 c^{2} + 2 c^{4} - c \): - The expression remains \( 6c^{2} + 2c^{4} - c \). 4. For \( 8 d - 2 - 4 d^{3} \): - The expression remains \( 8d - 2 - 4d^{3} \). None of the expressions can be simplified further.