Question: Value of x

In your equation, 2x = 4x -3, the x on the LEFT side does not represent the same value that x represents on the RIGHT side. So, your equation isn't valid.

Notice that, the two lengths (x+1) and (4x-3) could also be (x+3) and (4x). If we apply your strategy here, we conclude that 2x = 4x, which makes no sense.

Instead, we must us the RELATIONSHIPS between corresponding sides to solve this question.

Yes, I received the reply.
I didn't get back to you immediately, but I always answer questions within 24 hours.

Cheers,
Brent

We can certainly apply the enlargement factor here.

On the shown triangle, the side with length x+1 corresponds to the side with length 1 in the BASE triangle.

So, the enlargement factor = (x+1)/1 = x+1

On the shown triangle, the side with length 4x-3 corresponds to the side with length 2 in the BASE triangle.

So, we can write: (2)(x+1) = 4x-3
Expand: 2x + 2 = 4x - 3
Solve, to get: x = 5/2

Cheers,
Brent

If you remember that sin 60 = √3/2, then that will help you.
However, trigonometric ratios are beyond the scope of the GRE, so you can also just apply what you know about 30-60-90 right triangles.

Cheers,
Brent

That's a great approach! In fact, it shaves a step off my solution!

Using similar triangles, I first wrote: (x+1)/1 = (4x-3)/2
After cross multiplying, I got: 2(x+1) = 4x-3

In your (faster) solution, you started with 2(x+1) = 4x-3

Very nice!

Cheers,
Brent

That approach will also work (although you end up with a pretty tricky quadratic equation to solve)