\( 3.2 \begin{array}{l}\text { The first } 3 \text { terms of an infinite geometric series are given: } \\ (x+1)+2(x+1)^{2}+4(x+1)^{3}+\ldots .\end{array} \) \( \begin{array}{ll}3.2 .1 & \text { For which values of } x \text { will the series converge? } \\ 3.2 .2 & \text { If } x=-\frac{3}{4} \text {, determine the numerical value of the first term. } \\ \begin{array}{ll}3.2 .3 & \text { Write the series in sigma notation. } \\ 3.2 .4 & \text { Calculate the sum to infinity of the series. }\end{array}\end{array} \).

For an infinite geometric series to converge, the absolute value of the common ratio must be less than one. In this case, the first term is \( (x + 1) \) and the common ratio is \( 2(x + 1) \). Thus, we need \( |2(x + 1)| < 1 \). This can be solved to find the valid range for \( x \). After some algebra, we find convergence occurs when \( -\frac{3}{2} < x < -\frac{1}{2} \). Now, let's say you have \( x = -\frac{3}{4} \). Plugging that into the first term gives us \( -\frac{3}{4} + 1 = \frac{1}{4} \). Therefore, the value of the first term is \( \frac{1}{4} \). So, you're starting your series off on quite a positive note!