Step-by-Step Solution

1. Check for one-one: Assume \(f(x_1) = f(x_2)\) for some \(x_1, x_2 \in R_{+}\). Then, \(4x_1 + 3 = 4x_2 + 3\). Subtracting 3 from both sides, we get \(4x_1 = 4x_2\). Dividing by 4, we get \(x_1 = x_2\). Since \(f(x_1) = f(x_2)\) implies \(x_1 = x_2\), the function is one-one.
2. Check for onto: For a function to be onto, its range must be equal to its codomain. The codomain is given as \(R\), the set of all real numbers. Let \(y = f(x) = 4x + 3\). We need to check if for every \(y \in R\), there exists an \(x \in R_{+}\) such that \(y = 4x + 3\). Solving for \(x\), we get \(x = \frac{y - 3}{4}\). Since \(x \in R_{+}\), we must have \(x \geq 0\). Therefore, \(\frac{y - 3}{4} \geq 0\), which implies \(y - 3 \geq 0\), so \(y \geq 3\). This means that the range of \(f\) is \([3, \infty)\), which is not equal to the codomain \(R\). Therefore, the function is not onto.
3. Conclusion: The function is one-one but not onto.