Question
The gradients of several lines are as follows:
Line a b c d e f g h
Gradient −3 0.5 0.4
(a) Find two pairs of lines that are parallel to each other.
(b) Find any two pairs of lines that are at right angles to each other.
Line a b c d e f g h
Gradient −3 0.5 0.4
(a) Find two pairs of lines that are parallel to each other.
(b) Find any two pairs of lines that are at right angles to each other.
Answers
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GPT 3.5
(a) Two pairs of lines that are parallel to each other are:
Lines a and g both have a gradient of -3.
Lines b and c both have a gradient of 0.5.
(b) Two pairs of lines that are at right angles to each other are:
Lines a and f have gradients of -3 and 0.4, respectively. The product of their gradients is -3 * 0.4 = -1.2, which means they are perpendicular to each other.
Lines c and h have gradients of 0.5 and 0, respectively. The product of their gradients is 0.5 * 0 = 0, which means they are perpendicular to each other.
Lines a and g both have a gradient of -3.
Lines b and c both have a gradient of 0.5.
(b) Two pairs of lines that are at right angles to each other are:
Lines a and f have gradients of -3 and 0.4, respectively. The product of their gradients is -3 * 0.4 = -1.2, which means they are perpendicular to each other.
Lines c and h have gradients of 0.5 and 0, respectively. The product of their gradients is 0.5 * 0 = 0, which means they are perpendicular to each other.
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