It looks like this is an expression involving degrees. However, it is missing an operator or measurement type to indicate what it is supposed to represent.
For example, degrees can be used to measure angles in geometry. In that case, the expression (2x - 8)° might represent an angle, where 2x - 8 is the measurement in degrees.
Alternatively, degrees can be used to measure temperature. In that case, the expression (2x - 8)° might represent a temperature, where 2x - 8 is the temperature in degrees Fahrenheit or Celsius.
Without more context or information, it is difficult to determine the exact meaning of this expression.
help me I don't understand this....
(2x - 8)°
9 answers
Just solve it!!! (2x - 8)°
I apologize, but as an AI language model, I cannot "solve" an expression like this without knowing the context or what it is supposed to represent. Can you please provide more information or context?
It's an angle!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!! uguh!!!!!!!!! I ORDER YOU TO DO IT!
(2x - 8)°
(2x - 8)°
Sorry for the confusion. If (2x - 8)° represents an angle, then it is simply a measurement of an angle in degrees. The expression cannot be simplified any further unless the value of x is known.
To find the numerical value of the angle in degrees, we need to substitute a value for x. For example, if x = 6, then the angle would be:
(2(6) - 8)° = (12 - 8)° = 4°.
So, the angle would be 4 degrees when x = 6. However, if the value of x is not provided, we cannot determine the exact value of the angle.
To find the numerical value of the angle in degrees, we need to substitute a value for x. For example, if x = 6, then the angle would be:
(2(6) - 8)° = (12 - 8)° = 4°.
So, the angle would be 4 degrees when x = 6. However, if the value of x is not provided, we cannot determine the exact value of the angle.
oK... THANKS!!!!!!!!!!!!!
You're welcome! Feel free to ask if you have any more questions.
QRS and ∠TRS are adjacent angles that are complementary.
The measure of ∠QRS is 78°. What is the measure of ∠TRS?
The measure of ∠QRS is 78°. What is the measure of ∠TRS?
If ∠QRS and ∠TRS are adjacent angles that are complementary, that means they add up to 90°.
Let's start with the measure of ∠QRS, which we know is 78°.
We can use the fact that ∠QRS and ∠TRS are complementary to set up an equation:
∠QRS + ∠TRS = 90°
Substituting 78° for ∠QRS:
78° + ∠TRS = 90°
Now we can solve for ∠TRS:
∠TRS = 90° - 78°
∠TRS = 12°
Therefore, the measure of ∠TRS is 12 degrees.
Let's start with the measure of ∠QRS, which we know is 78°.
We can use the fact that ∠QRS and ∠TRS are complementary to set up an equation:
∠QRS + ∠TRS = 90°
Substituting 78° for ∠QRS:
78° + ∠TRS = 90°
Now we can solve for ∠TRS:
∠TRS = 90° - 78°
∠TRS = 12°
Therefore, the measure of ∠TRS is 12 degrees.