62 Midterm 2: Version A
Find the solution set of the system graphically.
- \(\left\{
\begin{array}{rrrrr}
x&+&2y&=&-5 \\
x&-&y&=&-2
\end{array}\right.\)
For problems 2–4, find the solution set of each system by any convenient method.
- \(\left\{
\begin{array}{rrrrr}
4x&-&3y&=&13 \\
5x&-&2y&=&4
\end{array}\right.\) - \(\left\{
\begin{array}{rrrrr}
x&-&2y&=&-5 \\
2x&+&y&=&5
\end{array}\right.\) - \(\left\{
\begin{array}{rrrrrrr}
x&+&y&+&2z&=&0 \\
2x&&&+&z&=&1 \\
&&3y&+&4z&=&0
\end{array}\right.\)
Reduce the following expressions in questions 5–7.
- \(28 - \{5x - \left[6x - 3(5 - 2x)\right]^0 \} + 5x^2\)
- \(4a^2 (a - 3)^2\)
- \((x^2 + 2x + 3)^2\)
Divide using long division.
- \((2x^3 - 7x^2 + 15) \div (x - 2)\)
For problems 9–12, factor each expression completely.
- \(2ab + 3ac - 4b - 6c\)
- \(a^2 - 2ab - 15b^2\)
- \(x^3 + x^2 - 9x - 9\)
- \(x^3 - 64y^3\)
Solve the following word problems.
- The sum of a brother's and sister’s ages is 35. Ten years ago, the brother was twice his sister’s age. How old are they now?
- Kyra gave her brother Mark a logic question to solve: If she has 20 coins in her pocket worth \(\$2.75\), and if the coins are only dimes and quarters, how many of each kind of coin does she have?
- A 50 kg blend of two different grades of tea is sold for \(\$191.25.\) If grade A sells for \(\$3.95\) per kg and grade B sells for \(\$3.70\) per kg, how many kg of each grade were used?
