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Question
12152-72-62-8^{\circ}C
Simplify the expression
12018-8^{\circ}C
Evaluate
12152-72-62-8^{\circ}C
Solution
12018-8^{\circ}C
Show Solutions
Factor the expression
\frac{2}{45}\left(270405-180^{\circ}C\right)
Evaluate
12152-72-62-8^{\circ}C
Subtract the numbers
12080-62-8^{\circ}C
Subtract the numbers
12018-8^{\circ}C
Solution
\frac{2}{45}\left(270405-180^{\circ}C\right)
Show Solutions
Find the roots
C=\frac{270405}{\pi }
Alternative Form
C\approx 4931595.839305^{\circ}
Alternative Form
C\approx 86072.584774
Evaluate
12152-72-62-8^{\circ}C
To find the roots of the expression,set the expression equal to 0
12152-72-62-8^{\circ}C=0
Subtract the numbers
12080-62-8^{\circ}C=0
Subtract the numbers
12018-8^{\circ}C=0
Move the constant to the right-hand side and change its sign
-8^{\circ}C=0-12018
Removing 0 doesn't change the value,so remove it from the expression
-8^{\circ}C=-12018
Change the signs on both sides of the equation
8^{\circ}C=12018
Divide both sides
\frac{8^{\circ}C}{8^{\circ}}=\frac{12018}{8^{\circ}}
Divide the numbers
C=\frac{12018}{8^{\circ}}
Solution
More Steps
Evaluate
\frac{12018}{8^{\circ}}
Rewrite the angle
More Steps
Evaluate
8^{\circ}
\text{Convert into radian measure,multiply by }\frac{\pi }{180^{\circ}}
8^{\circ}\times \frac{\pi }{180^{\circ}}
Calculate
\frac{2\pi }{45}
\frac{12018}{\frac{2\pi }{45}}
Rewrite the expression
12018\times \frac{45}{2\pi }
Reduce the numbers
6009\times \frac{45}{\pi }
Multiply the numbers
\frac{6009\times 45}{\pi }
Multiply the numbers
\frac{270405}{\pi }
C=\frac{270405}{\pi }
Alternative Form
C\approx 4931595.839305^{\circ}
Alternative Form
C\approx 86072.584774
Show Solutions
