To simplify the expression (2x+3) + (x-6), we can combine like terms.
First, distribute 1 to each term inside the parentheses:
2x + 3 + x - 6
Next, combine like terms:
(2x + x) + (3 - 6)
3x - 3
The simplified expression is 3x - 3.
(2x+3) + (x-6)
11 answers
No what does it equal
Apologies for the confusion. To find the value of the expression (2x+3) + (x-6), we need to know the value of x.
If we substitute x into the expression, we can calculate its value.
For example, let's assume x = 4:
(2x+3) + (x-6) = (2(4) + 3) + (4 - 6) = (8 + 3) + (-2) = 11 - 2 = 9
So, if x = 4, the expression (2x+3) + (x-6) equals 9.
If we substitute x into the expression, we can calculate its value.
For example, let's assume x = 4:
(2x+3) + (x-6) = (2(4) + 3) + (4 - 6) = (8 + 3) + (-2) = 11 - 2 = 9
So, if x = 4, the expression (2x+3) + (x-6) equals 9.
Two adjacent angles <1 and <2 form a resulting angle with measures 135° if m<1=(2x) and m<2 = (2x+7) what are the two unknown angle measures?
Given that the measure of angle <1 is represented as (2x) and the measure of angle <2 is represented as (2x+7), we can set up an equation to solve for the unknown angle measures.
We know that the sum of angle <1 and angle <2 equals 135°:
(2x) + (2x+7) = 135
Now, simplify the equation:
4x + 7 = 135
Subtract 7 from both sides:
4x = 128
Divide both sides by 4:
x = 32
Now, substitute the value of x back into the expressions for the angle measures:
Angle <1 = 2x = 2(32) = 64°
Angle <2 = 2x + 7 = 2(32) + 7 = 71°
Therefore, the measures of the two unknown angles are 64° and 71°.
We know that the sum of angle <1 and angle <2 equals 135°:
(2x) + (2x+7) = 135
Now, simplify the equation:
4x + 7 = 135
Subtract 7 from both sides:
4x = 128
Divide both sides by 4:
x = 32
Now, substitute the value of x back into the expressions for the angle measures:
Angle <1 = 2x = 2(32) = 64°
Angle <2 = 2x + 7 = 2(32) + 7 = 71°
Therefore, the measures of the two unknown angles are 64° and 71°.
I figured displays two complementary non-adjacent angles. If one of the angles has measure of 39° what is the other angle measure
If two angles are complementary, their measures add up to 90 degrees.
Let's assume one of the angles has a measure of 39°.
Since the angles are complementary, we can set up the equation:
39° + x = 90°
To solve for x, subtract 39° from both sides:
x = 90° - 39°
x = 51°
Therefore, the other angle measures 51°.
Let's assume one of the angles has a measure of 39°.
Since the angles are complementary, we can set up the equation:
39° + x = 90°
To solve for x, subtract 39° from both sides:
x = 90° - 39°
x = 51°
Therefore, the other angle measures 51°.
I figure shows two non-adjacent angles with measures (2x+3) and 2x if the angles are complementary, what is the equation for the angle measures?
If two angles are complementary, their measures add up to 90 degrees.
Let's assume the measure of one angle is (2x+3), and the measure of the other angle is 2x.
Since the angles are complementary, we can set up the equation:
(2x+3) + 2x = 90
To solve for x, combine like terms:
4x + 3 = 90
Next, subtract 3 from both sides:
4x = 87
Finally, divide both sides by 4:
x = 21.75
Therefore, the equation for the angle measures is:
(2x+3) = (2 * 21.75 + 3) = 46.5
And
2x = 2 * 21.75 = 43.5
The two angles are approximately 46.5° and 43.5°.
Let's assume the measure of one angle is (2x+3), and the measure of the other angle is 2x.
Since the angles are complementary, we can set up the equation:
(2x+3) + 2x = 90
To solve for x, combine like terms:
4x + 3 = 90
Next, subtract 3 from both sides:
4x = 87
Finally, divide both sides by 4:
x = 21.75
Therefore, the equation for the angle measures is:
(2x+3) = (2 * 21.75 + 3) = 46.5
And
2x = 2 * 21.75 = 43.5
The two angles are approximately 46.5° and 43.5°.
Idk im tired and i wanna go to beddd 😭
I understand. It's important to prioritize your rest and take care of yourself. If you have any more questions in the future, feel free to ask. Have a good night and get some rest! 😴