Three Circles and a Tangent Three Circles and
- Slides: 29
Three Circles and a Tangent
Three Circles and a Tangent SIC_48 The three circles are touching and share a common tangent. The radii of the two larger circles are as stated in the diagram - all units are cm. (Not to scale)
Three Circles and a Tangent
Three Circles and a Tangent
Three Circles and a Tangent
Three Circles and a Tangent
Three Circles and a Tangent
Three Circles and a Tangent
Three Circles and a Tangent Returning to our problem:
Three Circles and a Tangent
RESOURCES
Three Circles and a Tangent SIC_48 The three circles are touching and share a common tangent. The radii of the two larger circles are as stated in the diagram - all units are cm. (Not to scale)
Three Circles and a Tangent SIC_48 The three circles are touching and share a common tangent. The radii of the two larger circles are as stated in the diagram - all units are cm. (Not to scale)
Three Circles and a Tangent SIC_48 The three circles are touching and share a common tangent. The radii of the two larger circles are as stated in the diagram - all units are cm. (Not to scale)
Three Circles and a Tangent SIC_48 The three circles are touching and share a common tangent. The radii of the two larger circles are as stated in the diagram - all units are cm. (Not to scale)
Three Circles and a Tangent SIC_48 The three circles are touching and share a common tangent. The radii of the two larger circles are as stated in the diagram - all units are cm. (Not to scale)
Three Circles and a Tangent SIC_48 The three circles are touching and share a common tangent. The radii of the two larger circles are as stated in the diagram - all units are cm. (Not to scale)
Three Circles and a Tangent SIC_48 The three circles are touching and share a common tangent. The radii of the two larger circles are as stated in the diagram - all units are cm. (Not to scale)
Three Circles and a Tangent SIC_48 The three circles are touching and share a common tangent. The radii of the two larger circles are as stated in the diagram - all units are cm. (Not to scale)
Three Circles and a Tangent SIC_48 The three circles are touching and share a common tangent. The radii of the two larger circles are as stated in the diagram - all units are cm. (Not to scale)
Three Circles and a Tangent SIC_48 The three circles are touching and share a common tangent. The radii of the two larger circles are as stated in the diagram - all units are cm. (Not to scale)
Three Circles and a Tangent SIC_48 The three circles are touching and share a common tangent. The radii of the two larger circles are as stated in the diagram - all units are cm. (Not to scale)
Three Circles and a Tangent SIC_48 The three circles are touching and share a common tangent. The radii of the two larger circles are as stated in the diagram - all units are cm. (Not to scale)
Three Circles and a Tangent SIC_48 The three circles are touching and share a common tangent. The radii of the two larger circles are as stated in the diagram - all units are cm. (Not to scale)
Three Circles and a Tangent SIC_48 The three circles are touching and share a common tangent. The radii of the two larger circles are as stated in the diagram - all units are cm. (Not to scale)
Three Circles and a Tangent SIC_48 The three circles are touching and share a common tangent. The radii of the two larger circles are as stated in the diagram - all units are cm. (Not to scale)
Three Circles and a Tangent SIC_48 The three circles are touching and share a common tangent. The radii of the two larger circles are as stated in the diagram - all units are cm. (Not to scale)
- Internal tangent vs external tangent
- Theorems on angles formed by tangents and secants
- Internal tangent vs external tangent
- External tangent
- Line that is tangent to two coplanar circles
- Disequity
- Three circles analysis
- Graph of cotangent
- Angles formed by secants and tangents
- Sine, cosine, and tangent
- Practice 11-1 tangent lines
- Secant of a circle
- Tangent period
- Secants, tangents, and angle measures
- Domain and range of secant function
- Graph y=csc(x)
- Use properties of tangents
- The derivative and the tangent line problem
- The tangent and velocity problems
- Classification of engineering curves
- Engineering curves
- General equation of cone
- Integrals involving powers of secant and tangent
- Ratio for tangent
- What is the ratio for tangent
- Tangent planes and normal lines
- Vertical tangent line
- Common internal tangent
- Hypotenuse/opposite
- Trig ratios worksheet