Tangent Lines - GMAT Quantitative

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Find the slope of the line tangent to circle at the point .

I) Circle has a radius of units.

II) The area of circle f is $169\pi $units^2$$ .

Tap to see back →

In this case, I and II give us a ton of information about the size of the circle, but we have no clue as to its location.

In order to know the slope of the tangent line, we need to know location of the circle, so we cannot solve this problem.

Find the slope of the line tangent to circle at the point .

I) Circle has a radius of units.

II) The area of circle f is $169\pi $units^2$$ .

Tap to see back →

In this case, I and II give us a ton of information about the size of the circle, but we have no clue as to its location.

In order to know the slope of the tangent line, we need to know location of the circle, so we cannot solve this problem.

Find the slope of the line tangent to circle at the point .

I) Circle has a radius of units.

II) The area of circle f is $169\pi $units^2$$ .

Tap to see back →

In this case, I and II give us a ton of information about the size of the circle, but we have no clue as to its location.

In order to know the slope of the tangent line, we need to know location of the circle, so we cannot solve this problem.

Find the slope of the line tangent to circle at the point .

I) Circle has a radius of units.

II) The area of circle f is $169\pi $units^2$$ .

Tap to see back →

In this case, I and II give us a ton of information about the size of the circle, but we have no clue as to its location.

In order to know the slope of the tangent line, we need to know location of the circle, so we cannot solve this problem.

Find the slope of the line tangent to circle at the point .

I) Circle has a radius of units.

II) The area of circle f is $169\pi $units^2$$ .

Tap to see back →

In this case, I and II give us a ton of information about the size of the circle, but we have no clue as to its location.

In order to know the slope of the tangent line, we need to know location of the circle, so we cannot solve this problem.

Find the slope of the line tangent to circle at the point .

I) Circle has a radius of units.

II) The area of circle f is $169\pi $units^2$$ .

Tap to see back →

In this case, I and II give us a ton of information about the size of the circle, but we have no clue as to its location.

In order to know the slope of the tangent line, we need to know location of the circle, so we cannot solve this problem.

Find the slope of the line tangent to circle at the point .

I) Circle has a radius of units.

II) The area of circle f is $169\pi $units^2$$ .

Tap to see back →

In this case, I and II give us a ton of information about the size of the circle, but we have no clue as to its location.

In order to know the slope of the tangent line, we need to know location of the circle, so we cannot solve this problem.

Tangent Lines - GMAT Quantitative

Find the slope of the line tangent to circle at the point . I) Circle has a radius of units. II) The area of circle f is .

In this case, I and II give us a ton of information about the size of the circle, but we have no clue as to its location. In order to know the slope of the tangent line, we need to know location of the circle, so we cannot solve this problem.

Find the slope of the line tangent to circle at the point . I) Circle has a radius of units. II) The area of circle f is .

In this case, I and II give us a ton of information about the size of the circle, but we have no clue as to its location. In order to know the slope of the tangent line, we need to know location of the circle, so we cannot solve this problem.

Find the slope of the line tangent to circle at the point . I) Circle has a radius of units. II) The area of circle f is .

In this case, I and II give us a ton of information about the size of the circle, but we have no clue as to its location. In order to know the slope of the tangent line, we need to know location of the circle, so we cannot solve this problem.

Find the slope of the line tangent to circle at the point . I) Circle has a radius of units. II) The area of circle f is .

In this case, I and II give us a ton of information about the size of the circle, but we have no clue as to its location. In order to know the slope of the tangent line, we need to know location of the circle, so we cannot solve this problem.

Find the slope of the line tangent to circle at the point . I) Circle has a radius of units. II) The area of circle f is .

In this case, I and II give us a ton of information about the size of the circle, but we have no clue as to its location. In order to know the slope of the tangent line, we need to know location of the circle, so we cannot solve this problem.

Find the slope of the line tangent to circle at the point . I) Circle has a radius of units. II) The area of circle f is .

In this case, I and II give us a ton of information about the size of the circle, but we have no clue as to its location. In order to know the slope of the tangent line, we need to know location of the circle, so we cannot solve this problem.

Find the slope of the line tangent to circle at the point . I) Circle has a radius of units. II) The area of circle f is .

In this case, I and II give us a ton of information about the size of the circle, but we have no clue as to its location. In order to know the slope of the tangent line, we need to know location of the circle, so we cannot solve this problem.

Find the slope of the line tangent to circle at the point .

I) Circle has a radius of units.

II) The area of circle f is $169\pi $units^2$$ .

In this case, I and II give us a ton of information about the size of the circle, but we have no clue as to its location.

In order to know the slope of the tangent line, we need to know location of the circle, so we cannot solve this problem.

Find the slope of the line tangent to circle at the point .

I) Circle has a radius of units.

II) The area of circle f is $169\pi $units^2$$ .

In this case, I and II give us a ton of information about the size of the circle, but we have no clue as to its location.

In order to know the slope of the tangent line, we need to know location of the circle, so we cannot solve this problem.

Find the slope of the line tangent to circle at the point .

I) Circle has a radius of units.

II) The area of circle f is $169\pi $units^2$$ .

In this case, I and II give us a ton of information about the size of the circle, but we have no clue as to its location.

In order to know the slope of the tangent line, we need to know location of the circle, so we cannot solve this problem.

Find the slope of the line tangent to circle at the point .

I) Circle has a radius of units.

II) The area of circle f is $169\pi $units^2$$ .

In this case, I and II give us a ton of information about the size of the circle, but we have no clue as to its location.

In order to know the slope of the tangent line, we need to know location of the circle, so we cannot solve this problem.

Find the slope of the line tangent to circle at the point .

I) Circle has a radius of units.

II) The area of circle f is $169\pi $units^2$$ .

In this case, I and II give us a ton of information about the size of the circle, but we have no clue as to its location.

In order to know the slope of the tangent line, we need to know location of the circle, so we cannot solve this problem.

Find the slope of the line tangent to circle at the point .

I) Circle has a radius of units.

II) The area of circle f is $169\pi $units^2$$ .

In this case, I and II give us a ton of information about the size of the circle, but we have no clue as to its location.

In order to know the slope of the tangent line, we need to know location of the circle, so we cannot solve this problem.

Find the slope of the line tangent to circle at the point .

I) Circle has a radius of units.

II) The area of circle f is $169\pi $units^2$$ .

In this case, I and II give us a ton of information about the size of the circle, but we have no clue as to its location.

In order to know the slope of the tangent line, we need to know location of the circle, so we cannot solve this problem.