Let's assume that <1 and <3 are both labeled as "x" since they are vertical angles.
Since <1 and <3 are vertical angles, their measures are equal, so we can write the equation: x + x = 68.
Combining like terms, we have: 2x = 68.
To solve for x, we divide both sides of the equation by 2: 2x/2 = 68/2.
This simplifies to: x = 34.
Therefore, each angle in the pair (<1 and <3) has a measure of 34 degrees.
two intersecting lines create four angels; <1 and <3 are vertical pair. Their sum of their measures is equal to 68 . what equation solves for the value of each equation?
5 answers
two intersecting lines create four angels; <1 and <3 are vertical pair. Their sum of their measures is equal to 68 . what equation solves for the value of each equation?
68r = 2
2r + 68 = 180
r = 68
2r = 68
68r = 2
2r + 68 = 180
r = 68
2r = 68
Let's clarify the problem. We have two intersecting lines that create four angles. Two of these angles, labeled as <1 and <3, are vertical angles. The sum of their measures is equal to 68 degrees. We need to find the measure of each angle.
Let's assume that <1 and <3 are both labeled as "x" since they are vertical angles.
Since the sum of their measures is equal to 68 degrees, we can write the equation: x + x = 68.
Combining like terms, we have: 2x = 68.
To solve for x, we divide both sides of the equation by 2: 2x/2 = 68/2.
This simplifies to: x = 34.
Therefore, each angle in the pair (<1 and <3) has a measure of 34 degrees.
Let's assume that <1 and <3 are both labeled as "x" since they are vertical angles.
Since the sum of their measures is equal to 68 degrees, we can write the equation: x + x = 68.
Combining like terms, we have: 2x = 68.
To solve for x, we divide both sides of the equation by 2: 2x/2 = 68/2.
This simplifies to: x = 34.
Therefore, each angle in the pair (<1 and <3) has a measure of 34 degrees.
its not 34
Apologies for the confusion. Let's solve the problem again.
We have two intersecting lines that create four angles. Let <1 and <3 be the vertical pair, and their sum of measures is equal to 68 degrees.
Since <1 and <3 are vertical angles, they have equal measures. Let's assume the measure of <1 and <3 is "x" degrees.
The sum of the measures of <1 and <3 is given as 68 degrees, so we can write the equation: x + x = 68.
Simplifying, we have: 2x = 68.
Dividing both sides of the equation by 2, we get: x = 68 / 2.
Thus, x = 34.
Therefore, each angle in the vertical pair ( <1 and <3) has a measure of 34 degrees.
We have two intersecting lines that create four angles. Let <1 and <3 be the vertical pair, and their sum of measures is equal to 68 degrees.
Since <1 and <3 are vertical angles, they have equal measures. Let's assume the measure of <1 and <3 is "x" degrees.
The sum of the measures of <1 and <3 is given as 68 degrees, so we can write the equation: x + x = 68.
Simplifying, we have: 2x = 68.
Dividing both sides of the equation by 2, we get: x = 68 / 2.
Thus, x = 34.
Therefore, each angle in the vertical pair ( <1 and <3) has a measure of 34 degrees.