Question
Draw the taxicab circle with the given radius r and centre C.
I) r = 1, C = (1, 1)
II) r = 2, C = (-2, -2)
Hint:
A taxicab circle is a circle of the set of points which are a constant distance from a centre.
For example, if we take all the points which are a distance of 4 units from a point, then we have a circle of radius 4 with a centre at the point.
The correct answer is: the taxicab circle for both cases has been drawn above
l) Taxicab circle for r = 1, C = (1, 1) is
ll) Taxicab circle for r = 2, C = (-2, -2) is
Final Answer:
Hence, the taxicab circle for both cases has been drawn above.
ll) Taxicab circle for r = 2, C = (-2, -2) is
Final Answer:
Hence, the taxicab circle for both cases has been drawn above.
Related Questions to study
Solve each compound inequality and graph the solution
On the number line, we can graph the compound inequalities. When graphing compound inequalities, keep the following points in mind.
• Consider a number on the number line that corresponds to the inequality. For example, if x > 2, we must determine where '2' falls on the number line.
• If the inequality is either ">" or "<, "place an open dot (to indicate that the value is "NOT" included).
If the inequality is either "≥" or " ≤, "place a closed dot to include the value.
For example, if x > 2, place an open dot at '2' because the inequality is strict and does not include " =."
• Place an arrow symbol on the right side of the number for the ">" or "≥" sign.
• Place an arrow symbol on the left side of the number for the " <"or " ≤" sign.
• Finally, use the intersection or union, depending on whether "AND" or "OR" is given, to find the final solution.
Solve each compound inequality and graph the solution
On the number line, we can graph the compound inequalities. When graphing compound inequalities, keep the following points in mind.
• Consider a number on the number line that corresponds to the inequality. For example, if x > 2, we must determine where '2' falls on the number line.
• If the inequality is either ">" or "<, "place an open dot (to indicate that the value is "NOT" included).
If the inequality is either "≥" or " ≤, "place a closed dot to include the value.
For example, if x > 2, place an open dot at '2' because the inequality is strict and does not include " =."
• Place an arrow symbol on the right side of the number for the ">" or "≥" sign.
• Place an arrow symbol on the left side of the number for the " <"or " ≤" sign.
• Finally, use the intersection or union, depending on whether "AND" or "OR" is given, to find the final solution.
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We will use the following steps to solve a system of linear inequalities graphically as per Kona's error described in the question:
1. Determine the inequality for y.
2. Graph the line as a solid or dashed line depending on the sign of the inequality.
• Draw the line as a dashed line if the inequality sign lacks an equals sign (or >).
• If the inequality sign includes an equals sign, draw the line as a solid line (or).
3. Highlight the area that satisfies the inequality.
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Kona Graphed the compound inequality x > 2 or x > 3 by graphing x > 3. Explain Kona’s error.
We will use the following steps to solve a system of linear inequalities graphically as per Kona's error described in the question:
1. Determine the inequality for y.
2. Graph the line as a solid or dashed line depending on the sign of the inequality.
• Draw the line as a dashed line if the inequality sign lacks an equals sign (or >).
• If the inequality sign includes an equals sign, draw the line as a solid line (or).
3. Highlight the area that satisfies the inequality.
4. Repeat steps 1–3 for each inequality.
5. The overlapping region of all the inequalities will be the solution set.
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¶Most of the time, the solutions can be determined between two quantities. Where sometimes, it goes on for a while in one direction. An example of borderline high blood pressure is the systolic blood pressure range of 120 to 139 mm mercury (Hg).
¶The graph intersection of the inequalities is represented by the graph of a compound inequality with "and." If a particular number resolves both inequalities, it is a solution to the compound inequality. It can be expressed as either x > -1 and x
When a < b, how is the graph of x > a and x < b similar to the graph of x > a? How is it different?
At least two inequalities separated by "and" or "or" make up a compound inequality.
¶Most of the time, the solutions can be determined between two quantities. Where sometimes, it goes on for a while in one direction. An example of borderline high blood pressure is the systolic blood pressure range of 120 to 139 mm mercury (Hg).
¶The graph intersection of the inequalities is represented by the graph of a compound inequality with "and." If a particular number resolves both inequalities, it is a solution to the compound inequality. It can be expressed as either x > -1 and x