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Homework 1
Heather Macbeth edited this page Jan 16, 2024
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Let
$p$ and$q$ be integers and suppose that$p + 4q = 1$ and$q - 1 = 2$ . Show that$p = -11$ . -
Let
$a$ and$b$ be real numbers and suppose that$a + 2b = 4$ and$a - b = 1$ . Show that$a = 2$ . -
Let
$x$ be an integer, with$x \geq 9$ . Show that$x^3 - 8x^2 + 2x \geq 3$ . -
Let
$x$ be a rational number. Show that$x^2 - 2x \ge -1$ . -
Let
$a$ and$b$ be real numbers and suppose that$-b \le a \le b$ . Show that$a^2 \le b^2$ .
This problem is solved in words in the text in Example 2.1.7, so don't submit a solution in words, only in Lean.