Chapter 1 - Systems of Linear Equations - 1.3 Applications of Systems of Linear Equations - 1.3 Exercises - Page 32: 3

$$ p(x)=2 x. $$

Suppose that $$ p(x)=a_{0}+a_{1} x+a_{2} x^{2}. $$ Now, we have $$ \begin{array}{l} {p(2)=a_{0}+a_{1}(2)+a_{2}(2)^{2}=a_{0}+2a_{1}+4a_{2}=4} \\ {p(3)=a_{0}+a_{1}(3)+a_{2}(3)^{2}=a_{0}+3 a_{1}+9 a_{2}=6} \\ {p(5)=a_{0}+a_{1}(5)+a_{2}(5)^{2}=a_{0}+5 a_{1}+25 a_{2}=10} \end{array} $$ The above system gas the solution $$a_{0}=0, \quad a_{1}=2, \quad a_{2}=0.$$ Hence, $$ p(x)=2 x. $$