In a right triangle, the side opposite angle theta is 6 and the hypotenuse is 10. What is sin(theta)?
- 3/5
- 4/5
- 5/3
- 5/4
Show answer and explanation
Answer: 3/5
Sine is opposite over hypotenuse, so sin(theta) = 6/10 = 3/5.
SAT Math skill page
Use side ratios and special-triangle patterns to connect angles with missing lengths.
What this tests
Practice examples
In a right triangle, the side opposite angle theta is 6 and the hypotenuse is 10. What is sin(theta)?
Answer: 3/5
Sine is opposite over hypotenuse, so sin(theta) = 6/10 = 3/5.
For angle theta, tan(theta) = 3/4. If the adjacent leg is 12, what is the opposite leg?
Answer: 9
Tangent is opposite over adjacent. Set x/12 = 3/4 and solve to get x = 9.
A 30-60-90 triangle has a shortest side of length 5. What is the hypotenuse?
Answer: 10
The side ratio is 1 : square root 3 : 2, so the hypotenuse is twice the shortest side.
Quick drills
Pause before the answer choices, write the rule or setup you need, then check whether the question is asking for the value, the relationship, or the best-supported conclusion.
Pause before the answer choices, write the rule or setup you need, then check whether the question is asking for the value, the relationship, or the best-supported conclusion.
Pause before the answer choices, write the rule or setup you need, then check whether the question is asking for the value, the relationship, or the best-supported conclusion.
Pause before the answer choices, write the rule or setup you need, then check whether the question is asking for the value, the relationship, or the best-supported conclusion.
Avoid these traps
Label opposite, adjacent, and hypotenuse relative to the marked angle before choosing a trig function.
Opposite and adjacent switch when the reference angle changes, even though the triangle stays the same.
Write the 30-60-90 or 45-45-90 ratio before scaling it to the given side.
Study plan
Related practice
Skill cluster
FAQ
SAT questions can use sine, cosine, and tangent, along with special right-triangle relationships.
It is a useful shortcut for remembering the three side ratios, even though the SAT provides some geometry formulas.
The right-triangles page focuses on side lengths and the Pythagorean theorem. This page focuses specifically on angle-based trig ratios.