| Goemtry |
| Quarter 1 | Quarter 2 | Quarter 3| Quarter 4 |
Quarter 1 UNIT 1: a. Explore and recognize geometric patterns. b. Identify and apply basic definitions of geometry. c. Identify and apply segment relationships including segment addition, midpoint of a segment, and the concept of betweenness. d. Graph points and lines in the coordinate plane. e. Calculate the distance between two points in the coordinate plane. f. Find the midpoint of a given segment in the coordinate plane. g. Identify and apply angle relationships including complementary, supplementary, vertical, and adjacent angles. h. Construct a segment bisector and the bisector of a given angle. i. Find the perimeter and area of common plane figures. j. Represent a point in space as an ordered triple. k. Use the distance and midpoint formulas for segments in three-dimensional space. l. Explore relationships given a set of points in space such as collinear, coplanar, and relative placement inside or outside a figure. UNIT 2: a. Use inductive reasoning to arrive at a valid conclusion. b. Analyze and rewrite conditional and biconditional statements. c. Find a counterexample to disprove a conjecture. d. Write the inverse, converse, and contrapositive of a conditional statement. e. Use point, line, and plane postulates to solve problems and prove theorems about segments and angles. f. Use deductive reasoning to prove a conjecture. g. Use the properties of equality in a geometric situation. h. Present valid arguments in the form of narrative, flow chart, or two-column proof. i. Construct a segment congruent to a given segment. j. Draw conclusions from a Venn diagram. k. Identify errors in mathematical and logical reasoning. l. Use indirect proof to justify algebraic and geometric conjectures. |
| Quarter 2 UNIT 3: a. Identify parallel and perpendicular lines and planes. b. Draw parallel lines, intersecting lines, and perpendicular bisectors. c. Determine the measures of angles formed by parallel lines, perpendicular lines, and transversals. d. Prove statements and theorems using parallel and perpendicular lines. e. Determine the slope of a line parallel or perpendicular to a given line. f. Construct a line perpendicular to a line at a given point on the line, a line perpendicular from a given point to a line, an angle congruent to a given angle, and the parallel to a given line through a given point not on that line. UNIT 4: a. Classify triangles by their sides and by their angles. b. Apply the Triangle-Angle Sum Theorem, the Isosceles Triangle Theorem and its converse, and the Exterior Angle Theorem. c. Name corresponding parts of congruent polygons. d. Prove triangles congruent using SAS, SSS, ASA, AAS, and HL theorems. e. Construct a triangle congruent to a given triangle. f. Use congruent triangles to prove statements and theorems. g. Use the Perpendicular Bisector Theorem and its converse. h. Use the Angle Bisector Theorem and its converse. i. Identify and construct the median, the altitude, and the perpendicular bisector of the sides of a triangle. j. Identify the midsegments of a triangle and use the properties of the midsegment of a triangle. k. Compare the side and angle measurements in one triangle. l. Use the Triangle Inequality Theorem. m. Construct, in the context of a real-world application, the centroid, circumcenter, and incenter of a triangle. |
| Quarter 3 UNIT 5: a. Identify regular and nonregular polygons. b. Describe the characteristics of a quadrilateral. c. Apply the properties of parallelograms. d. Justify that a quadrilateral is a parallelogram. e. Use the properties of special quadrilaterals. f. Investigate the family hierarchy of quadrilaterals. g. Calculate the area of triangles and quadrilaterals. h. Justify that a quadrilateral is a rectangle, rhombus, or square. UNIT 6: a. Perform geometric transformations including reflections, rotations, translations and dilations. b. Describe how transformations affect the properties of geometric figures. c. Use transformations to recognize and create designs. d. Name corresponding parts of similar polygons. e. Apply proportions to similar figures in real-world problems. f. Prove triangles similar using AA, SSS, SAS Similarity Theorems. g. Write and plot ordered pairs from matrix notation and find transformation images, including rotations, reflections, dilations and translations, using matrices. h. Identify the distance and direction of a given vector and find resultant vectors. i. Describe translations using vectors and find translation images using vector sums. UNIT 7: a. State and apply the theorem involving the altitude on the hypotenuse as the geometric mean, and find the geometric mean between two numbers. b. Define and apply the Pythagorean Theorem and its converse. c. Use the Pythagorean Theorem to develop and solve problems involving right triangles and special right triangles (30-60-90 and 45-45-90). d. Define sine, cosine, and tangent ratios in right triangles. e. Use appropriate keystrokes on a graphing calculator to find trigonometric ratios and measures of angles. f. Find the missing parts of a right triangle using trigonometric and inverse trigonometric ratios. g. Apply right triangle trigonometry to real-world situations. h. Apply the Law of Sines and the Law of Cosines to solve problems involving oblique triangles, disregarding problems that use the ambiguous case for Law of Sines. |
| Quarter 4 UNIT 8: a. Find the measures of interior and exterior angles of polygons. b. Determine the perimeter and area of regular polygons. c. Find the area of similar figures. d. Compare perimeter and area of congruent and similar polygons. UNIT 9: a. Calculate the volume and surface areas of solid figures including composite figures. b. Compare linear dimensions, surface area, and volume of similar figures using ratios. c. Apply formulas for surface area and volume to real-world situations. d. Explore nets of three-dimensional figures. e. Analyze the properties and relationships of geometric solids with bases other than rectangles, triangles, or circles. f. Analyze the properties and relationships of truncated three-dimensional solids. UNIT 10: a. Calculate the measure of angles and line segments created by radii, chords, secants, and tangents. b. Apply relationships among central angles, inscribed angles, and arcs of circles. c. Solve problems involving inscribed and circumscribed polygons. d. Construct a tangent to a circle at a given point when the given point is on that circle and when the point is not on that circle. e. Calculate circumference, arc length, and area of a circle and a sector. f. Explore the relationship between radian measure and the corresponding degree measure from 0 to 2π. |