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SAT 4 Math Module 2nd
Kapil Joshi
Created on January 5, 2025
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Transcript
Practice using Dosmos calculator before final
Opportunities
Quick equation solving using reference & hints
Strengths
Spending more time in earlier questions
THREATS
Skipping questions without answering
BAD
math module 2nd:4th test
It is the replica of the actual test, so you will get familiar with the environment.You will see a time limit on the top of slides based on every individual question.
SAT
Mark For Review
01:59
Reference
Calculator
Practice Questions: Math
Directions
Mark For Review
01:59
Reference
Calculator
Practice Questions: Math
Directions
Click to zoom images
01:59
Mark For Review:
Reference
Calculator
NOTE: In the final exam, you will see a text box where you type your answer, but we have included options here for convenience.
Practice Questions: Math
Directions
y = x2 - 14x + 22
Click to zoom images
01:59
Mark For Review:
Reference
Calculator
NOTE: In the final exam, you will see a text box where you type your answer, but we have included options here for convenience.
Practice Questions: Math
Directions
Which expression is equivalent to 9x2 + 5x?
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01:59
Reference
Calculator
Directions
Practice Questions: Math
The function f is defined by . What is the y-intercept of the graph of y = f(x) in the xy-plane?
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01:59
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Directions
Practice Questions: Math
The function f is defined by f(x) = 7x3. In the xy-plane, the graph of y = g(x) is the result of shifting the graph of y = f(x) down 2 units. Which equation defines function g?
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01:59
Reference
Calculator
Directions
Practice Questions: Math
x + 7 = 10 (x + 7)2 = y
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01:59
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Calculator
Directions
Practice Questions: Math
Which expression is equivalent to (7x3 + 7x) - (6x3 - 3x)?
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01:59
Reference
Calculator
Directions
Practice Questions: Math
The function p is defined by p(n) = 7n3. What is the value of n when p(n) is equal to 56?
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10
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Calculator
Practice Questions: Math
Directions
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11
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Calculator
Practice Questions: Math
Directions
f(t) = 8,000(0.65)t
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12
Reference
Calculator
Directions
Practice Questions: Math
Mark For Review
01:59
13
Reference
Calculator
Practice Questions: Math
Directions
y = 4x 3x + y = 18
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14
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Calculator
Directions
Practice Questions: Math
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01:59
15
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Calculator
Practice Questions: Math
Directions
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16
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Practice Questions: Math
Directions
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17
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Practice Questions: Math
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18
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Calculator
Practice Questions: Math
Directions
I. The median of data set A is equal to the median of data set B. II. The standard deviation of data set A is equal to the standard deviation of data set B.
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19
Reference
Calculator
Directions
Practice Questions: Math
An isosceles right triangle has a perimeter of inches. What is the length, in inches, of one leg of this triangle?
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01:59
20
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Calculator
Directions
Practice Questions: Math
-9x2 + 30x + c = 0
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01:59
21
Reference
Calculator
Directions
Practice Questions: Math
Click to zoom images
01:59
Mark For Review:
22
Reference
Calculator
NOTE: In the final exam, you will see a text box where you type your answer, but we have included options here for convenience.
Practice Questions: Math
Directions
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On test day, you won't be able to move on to the next module until time expires. Now, scroll down in Mr English and KJ website, and find all the answers with hints and explanations.
The number of degrees of arc in a circle is 360. The number of radians of arc in a circle is 2π. The sum of the measures in degrees of the angles of a triangle is 180.
The number of degrees of arc in a circle is 360. The number of radians of arc in a circle is 2π. The sum of the measures in degrees of the angles of a triangle is 180.
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SAT MATH TRICKS & TIPS
The number of degrees of arc in a circle is 360. The number of radians of arc in a circle is 2π. The sum of the measures in degrees of the angles of a triangle is 180.
The number of degrees of arc in a circle is 360. The number of radians of arc in a circle is 2π. The sum of the measures in degrees of the angles of a triangle is 180.
The number of degrees of arc in a circle is 360. The number of radians of arc in a circle is 2π. The sum of the measures in degrees of the angles of a triangle is 180.
The number of degrees of arc in a circle is 360. The number of radians of arc in a circle is 2π. The sum of the measures in degrees of the angles of a triangle is 180.
The number of degrees of arc in a circle is 360. The number of radians of arc in a circle is 2π. The sum of the measures in degrees of the angles of a triangle is 180.
The number of degrees of arc in a circle is 360. The number of radians of arc in a circle is 2π. The sum of the measures in degrees of the angles of a triangle is 180.
The number of degrees of arc in a circle is 360. The number of radians of arc in a circle is 2π. The sum of the measures in degrees of the angles of a triangle is 180.
The number of degrees of arc in a circle is 360. The number of radians of arc in a circle is 2π. The sum of the measures in degrees of the angles of a triangle is 180.
The number of degrees of arc in a circle is 360. The number of radians of arc in a circle is 2π. The sum of the measures in degrees of the angles of a triangle is 180.
The number of degrees of arc in a circle is 360. The number of radians of arc in a circle is 2π. The sum of the measures in degrees of the angles of a triangle is 180.
The number of degrees of arc in a circle is 360. The number of radians of arc in a circle is 2π. The sum of the measures in degrees of the angles of a triangle is 180.
The number of degrees of arc in a circle is 360. The number of radians of arc in a circle is 2π. The sum of the measures in degrees of the angles of a triangle is 180.
The number of degrees of arc in a circle is 360. The number of radians of arc in a circle is 2π. The sum of the measures in degrees of the angles of a triangle is 180.
The number of degrees of arc in a circle is 360. The number of radians of arc in a circle is 2π. The sum of the measures in degrees of the angles of a triangle is 180.
The number of degrees of arc in a circle is 360. The number of radians of arc in a circle is 2π. The sum of the measures in degrees of the angles of a triangle is 180.
The number of degrees of arc in a circle is 360. The number of radians of arc in a circle is 2π. The sum of the measures in degrees of the angles of a triangle is 180.
The number of degrees of arc in a circle is 360. The number of radians of arc in a circle is 2π. The sum of the measures in degrees of the angles of a triangle is 180.
The number of degrees of arc in a circle is 360. The number of radians of arc in a circle is 2π. The sum of the measures in degrees of the angles of a triangle is 180.
The number of degrees of arc in a circle is 360. The number of radians of arc in a circle is 2π. The sum of the measures in degrees of the angles of a triangle is 180.
The number of degrees of arc in a circle is 360. The number of radians of arc in a circle is 2π. The sum of the measures in degrees of the angles of a triangle is 180.