You learn core algebra skills used in university math and applied fields.
Focus areas
equations and inequalities
functions and graphs
polynomials and factoring
linear systems
Outcomes
solve algebraic problems step by step
interpret graphs and mathematical relationships
prepare for calculus and technical courses
Focus areas
equations and inequalities
functions and graphs
polynomials and factoring
linear systems
Outcomes
solve algebraic problems step by step
interpret graphs and mathematical relationships
prepare for calculus and technical courses
You build the mathematical foundation required before calculus.
Focus areas
functions and transformations
trigonometry and identities
exponential and logarithmic functions
analytic geometry
Outcomes
analyze complex functions
solve trigonometric equations
transition smoothly into calculus and advanced math courses
Focus areas
functions and transformations
trigonometry and identities
exponential and logarithmic functions
analytic geometry
Outcomes
analyze complex functions
solve trigonometric equations
transition smoothly into calculus and advanced math courses
You explore statistics and probability for data analysis and decision making.
Focus areas
descriptive statistics
probability rules and distributions
sampling and estimation
hypothesis testing
Outcomes
summarize data using charts and measures
calculate probability in real scenarios
interpret statistical results in research and business contexts
Focus areas
descriptive statistics
probability rules and distributions
sampling and estimation
hypothesis testing
Outcomes
summarize data using charts and measures
calculate probability in real scenarios
interpret statistical results in research and business contexts
You study the foundations of differential and integral calculus.
Focus areas
limits and continuity
derivatives and applications
integrals and area under curves
real-world optimization problems
Outcomes
analyze change using derivatives
compute definite and indefinite integrals
model physical and engineering problems mathematically
Focus areas
limits and continuity
derivatives and applications
integrals and area under curves
real-world optimization problems
Outcomes
analyze change using derivatives
compute definite and indefinite integrals
model physical and engineering problems mathematically