Why Scholars Point!
Our Vedic Math Techniques:
- Make your calculations Faster
- Will increase your speed and accuracy
- Remove Silly Mistakes
We offer:
- One to One SAT Preparation classes
- Small groups (Max intake 6 students) classes
- Customized Classes as per ones need
- Weekdays / weekend classes
SAT Exam Highlights:
Test Duration: 02 Hours
Mode of Test: Written-based examination (Digital in 2023)
Age Limit : No age limit ( but maximum aspirant are between 17 to 19 years)
Maximum Attempts : No Limit
Eligibility criteria : No criteria as such, but generally taken by students who are in high school
Official Website : //satsuite.collegeboard.org/sat
Acceptance: US, Canada, also accepted in UK and Australia
Organised by: The College Board
Test Structure of Math Test for SAT Exam:
Total Math Questions: 58
Total Time : 80 Minutes
Math Test– No Calculator
Time: 25 Minutes
Questions: 20
Math Test–Calculator
Time: 55 Minutes
Questions: 38
Marking : No Negative Marking
Type of Questions : Maximum Questions are MCQs
SAT Exam Syllabus for Maths
Heart of Algebra
- Create, solve, or interpret a linear expression or equation in 1 variable.
- Create, solve, or interpret linear inequalities in 1 variable.
- Build a linear function that models a linear relationship between 2 quantities.
- Create, solve, and interpret systems of linear inequalities in 2 variables.
- Create, solve, and interpret systems of 2 linear equations in 2 variables.
- Algebraically solve linear equations (or inequalities) in 1 variable.
- Algebraically solve systems of 2 linear equations in 2 variables.
- Interpret the variables and constants in expressions for linear functions.
- Understand connections between algebraic and graphical representations.
Problem Solving and Data Analysis:
- Use ratios, rates, proportional relationships, and scale drawings to solve single- and multistep problems.
- Solve single- and multistep problems involving percentages.
- Solve single- and multistep problems involving measurement quantities, units, and unit conversion.
- Use scatterplot, linear, quadratic, or exponential models to describe how the variables are related.
- Use the relationship between 2 variables to investigate key features of the graph.
- Compare linear growth with exponential growth.
- Use 2-way tables to summarize categorical data and relative frequencies and calculate conditional probability.
- Make inferences about population parameters based on sample data.
- Use statistics to investigate measures of center of data. Analyze shape, center, and spread.
- Evaluate reports to make inferences, justify conclusions, and determine appropriateness of data collection methods.
- The reports may consist of tables, graphs, or text summaries.
Passport to Advanced Math:
- Create a quadratic or exponential function or equation that models a context.
- Determine the most suitable form of an expression or equation to reveal a particular trait, given a context.
- Create equivalent expressions involving rational exponents and radicals, which includes simplifying or rewriting in other forms.
- Create an equivalent form of an algebraic expression by using structure and fluency with operations.
- Solve a quadratic equation having rational coefficients. The equation can be presented in a wide range of forms to reward attending to algebraic structure and can require manipulation to solve.
- Add, subtract, and multiply polynomial expressions. Simplify the result. The expressions will have rational coefficients.
- Solve an equation in 1 variable that contains radicals or contains the variable in the denominator of a fraction.
- Solve a system of 1 linear equation and 1 quadratic equation.
- Rewrite simple rational expressions.
- Interpret parts of nonlinear expressions in terms of their context.
- Understand the relationship between zeros and factors of polynomials. Use that knowledge to sketch graphs.
- Understand a nonlinear relationship between 2 variables by making connections between their algebraic and graphical representations.
- Use function notation, and interpret statements using function notation.
- Use structure to isolate or identify a quantity of interest in an expression or isolate a quantity of interest in an equation.
Additional Topics in Math:
- Solve problems using volume formulas.
- Use trigonometric ratios and the Pythagorean theorem to solve applied problems involving right triangles.
- Add, subtract, multiply, divide, and simplify complex numbers.
- Convert between degrees. Use radians to determine arc lengths. Use trigonometric functions of radian measure.
- Apply theorems about circles to find arc lengths, angle measures, chord lengths, and areas of sectors.
- Use concepts and theorems about congruence and similarity to solve problems about lines, angles, and triangles.
- Use the relationship between similarity, right triangles, and trigonometric ratios. Use the relationship between sine and cosine of complementary angles.
- Create or use an equation in 2 variables to solve a problem about a circle in the coordinate plane.
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