• The \(n\)-th term of an arithmetic progression is given by:

\(T_n=a+(n-1)d\)

• Where:
  \(a=\) first term,
  \(d=\) common difference,
  \(n=\) term number,
  \(T_n=n\)-th term.

• Formula to find the common difference:

\(d=T_n-T_{n-1}\)

• Example:
  For the sequence \(3\), \(7\), \(11\), \(15\), the common difference, \(d\):
  \(d=7-3=4\).

• The sum of the first \(n\) terms, \(S_n\), is given by:

\(S_n=\dfrac{n}{2}[2a+(n-1)d]\)

• Alternatively, it can be written as:

\(S_n=\dfrac{n}{2}(a+T_n)\)

• Given \(a=5\), \(d=3\), find the \(10^{\text{th}}\) term.
• Solution:
  \(\begin{aligned} T_{10}&=5+(10-1)\times 3 \\ &=5+27 \\ &=32. \end{aligned}\)

• Given \(a=2\), \(d=4\), find the sum of the first \(8\) terms.
• Solution:
  \(\begin{aligned} S_8&=\dfrac{8}{2}[2\times2+(8-1)\times4] \\ &=4[4+28] \\ &=4\times32 \\ &=128. \end{aligned}\)

• The \(n\)-th term of an arithmetic progression is given by:

\(T_n=a+(n-1)d\)

• Where:
  \(a=\) first term,
  \(d=\) common difference,
  \(n=\) term number,
  \(T_n=n\)-th term.

• Formula to find the common difference:

\(d=T_n-T_{n-1}\)

• Example:
  For the sequence \(3\), \(7\), \(11\), \(15\), the common difference, \(d\):
  \(d=7-3=4\).

• The sum of the first \(n\) terms, \(S_n\), is given by:

\(S_n=\dfrac{n}{2}[2a+(n-1)d]\)

• Alternatively, it can be written as:

\(S_n=\dfrac{n}{2}(a+T_n)\)

• Given \(a=5\), \(d=3\), find the \(10^{\text{th}}\) term.
• Solution:
  \(\begin{aligned} T_{10}&=5+(10-1)\times 3 \\ &=5+27 \\ &=32. \end{aligned}\)

• Given \(a=2\), \(d=4\), find the sum of the first \(8\) terms.
• Solution:
  \(\begin{aligned} S_8&=\dfrac{8}{2}[2\times2+(8-1)\times4] \\ &=4[4+28] \\ &=4\times32 \\ &=128. \end{aligned}\)