Find the values of x and y.
The image is a big X, so imagine this equation on the left inner side.
2x on the left.
(3y+25) on the top
110 on the bottom
x=35; y = 110
x=40; y = 40
x=110; y = 40
x=35; y = 40
What is the value of x? *
can someone please help????!!!
I am sorry, I do not understand the question.
Me either, thank you for at least reading it though, have a great rest of your day.
maybe
2 x = (3y+25) / 110 ????
if y = 40
2 x = (120+ 25)/110 = 145/110
x = 145 / 220 = 0.659
if y = 110
2 x = 3 *110/ 110 + 25/110 = 3 + 0.227
x = 1.5 + 0.113 = 1.613
this all makes no sense.
To find the value of x, you need to solve the equation on the left inner side of the big X. The equation given is 2x.
To solve for x, divide both sides of the equation by 2. This will isolate x on one side of the equation.
So, the equation becomes:
x = (2x) / 2
Simplifying, we have:
x = x
This means that x can be any value, as long as it is a real number.
Now, let's look at the answer options given:
- x=35; y=110
- x=40; y=40
- x=110; y=40
- x=35; y=40
None of these options specify a unique value for x. All values of x mentioned in the answer options are possible solutions for the equation 2x. So, the value of x is not definitively mentioned in the given answer options.
From your description, it sounds like 3y+25 = 110, since vertical angles are congruent. But that means x=70, which is not one of the choices.
so, I guess x=110 and you have muffed the description.