All SAT Math Resources
Example Questions
Example Question #1 : Circles
Two chords of a circle, and , intersect at a point . is twice as long as , , and .
Give the length of .
Insufficient information is given to find the length of .
Insufficient information is given to find the length of .
Let stand for the length of ; then the length of is twice this, or . The figure referenced is below:
If two chords intersect inside the circle, then they cut each other in such a way that the product of the lengths of the parts is the same for the two chords - that is,
Substituting the appropriate quantities, then solving for :
This statement is identically true. Therefore, without further information, we cannot determine the value of - the length of .
Example Question #1 : Circles
Two chords of a circle, and , intersect at a point . is 12 units longer than , , and .
Give the length of (nearest tenth, if applicable)
Let stand for the length of ; then the length of is . The figure referenced is below:
If two chords intersect inside the circle, then they cut each other in such a way that the product of the lengths of the parts is the same for the two chords - that is,
Substituting the appropriate quantities, then solving for :
This quadratic equation can be solved by completing the square; since the coefficient of is 12, the square can be completed by adding
to both sides:
Restate the trinomial as the square of a binomial:
Take the square root of both sides:
or
Either
,
in which case
,
or
in which case
,
Since is a length, we throw out the negative value; it follows that , the correct length of .
Example Question #1 : Chords
A diameter of a circle is perpendicular to a chord at a point .
What is the diameter of the circle?
Insufficient information is given to answer the question.
In a circle, a diameter perpendicular to a chord bisects the chord. This makes the midpoint of ; consequently, .
The figure referenced is below:
If two chords intersect inside the circle, then they cut each other in such a way that the product of the lengths of the parts is the same for the two chords - that is,
Setting , and solving for :
,
the correct length.
Example Question #1 : Circles
Two chords of a circle, and , intersect at a point .
Give the length of .
Insufficient information is given to answer the question.
Let , in which case ; the figure referenced is below (not drawn to scale).
If two chords intersect inside the circle, then they cut each other in such a way that the product of the lengths of the parts is the same for the two chords - that is,
Setting , and solving for :
,
which is the length of .
Example Question #2 : Circles
A diameter of a circle is perpendicular to a chord at point . and . Give the length of (nearest tenth, if applicable).
insufficient information is given to determine the length of .
A diameter of a circle perpendicular to a chord bisects the chord. Therefore, the point of intersection is the midpoint of , and
.
Let stand for the common length of and ,
The figure referenced is below.
If two chords intersect inside the circle, then they cut each other in such a way that the product of the lengths of the parts is the same for the two chords - that is,
Set and , and ; substitute and solve for :
This is the length of ; the length of is twice this, so
Example Question #251 : Geometry
Figure is not drawn to scale
In the provided diagram, the ratio of the length of to that of is 7 to 2. Evaluate the measure of .
Cannot be determined
Cannot be determined
The measure of the angle formed by the two secants to the circle from a point outside the circle is equal to half the difference of the two arcs they intercept; that is,
The ratio of the degree measure of to that of is that of their lengths, which is 7 to 2. Therefore,
Letting :
Therefore, in terms of :
Without further information, however, we cannot determine the value of or that of . Therefore, the given information is insufficient.
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