Math

Math 1

Math 2

Math 3

Math 4

100

Solve the equation.

^2/₅• b = ^12/₅

100

Simplify (-a²b³)²(c²)⁰

a⁴b⁶

100

Simplify Exponents and Radicals

Evaluate the following expression: ∛2 ∛(32)

100

Order from greatest to least
a) 25¹⁰⁰
b) 2³⁰⁰
c) 3⁴⁰⁰
d) 4²⁰⁰
e) 2⁶⁰⁰

3⁴⁰⁰ , 2⁶⁰⁰, 25¹⁰⁰ , 4²⁰⁰ , 2³⁰⁰

200

Complete the statement using < , > or =.

8^2/₃- 7¹^/₄ ____ 1

200

If (x² - y²) = 10 and (x + y) = 2, find x and y.

x = 7/2 (or 3.5) , y = -3/2 (or -1.5)

200

Use the table below to find the following if possible (example needs to be shown):

f ^-1(- 4)

200

When divided by x - 1, the polynomial P(x) = x⁵+ 2x³ +Ax + B, where A and B are constants, the remainder is equal to 2. When P(x) is divided by x + 3, the remainder is equal -314. Find A and B.

A = 4 and B = -5 : solve the above systems of equations.

Solution:
P(1) = 1⁵ + 2(1³) +A*(1) + B = 2 : remainder theorem
P(-3) = (-3)⁵ + 2(-3)³ +A*(-3) + B = -314

300

At 10:00 A.M., Archie leaves the house at a rate of 60 mi/h. At the same time, Luna leaves the same house at a rate of 50 mi/h in the opposite direction. At what time will the two be 330 miles apart?

60t ± 50t = 330: 1:00 P.M.

300

The area of a rectangular field is equal to 300 square meters. Its perimeter is equal to 70 meters. Find the length and width of this rectangle.

W = 15 and L = 20

300

Find the domain of the function f(x)=√(−x²−4).

−x²−4≤0

300

f(x) is a function such that f(x) + 3f(8 - x) = x for all real numbers x. Find the value of f(2).

f(2) = 2

400

Kevin is cutting wood to build his closet that are to be 14^1/₄inches wide. If he has a piece that is 114 inches long, how many boards can he cut from this wood piece?

Kevin can cut 8 pieces from this wood.

400

In a right triangle ABC with angle A equal to 90°, find angle B and C so that sin(B) = cos(B).

Let b be the length of the side opposite angle B and c the length of the side opposite angle C and h the length of the hypotenuse.
sin(B) = b/h and cos(B) = c/h
sin(B) = cos(B) means b/h = c/h which gives c = b

The two sides are equal in length means that the triangle is isosceles and angles B and C are equal in size of 45°.

400

Find the x and y intercepts of the parabola with equation y = - x² + 2 x + 3?

x = 3 and x = -1

y = - (0)

400

The sum of the first three terms of a geometric sequence is equal to 42. The sum of the squares of the same terms is equal to 1092. Find the three terms of the sequence.

(r² - r + 1) / (r² + r + 1) = 1092 / 42²
r = 4 , r = 1/4 : solve for r
a = 2 : substitute r = 4 and solve for a
a = 32 : substitute r = 1/4 and solve for a
a = 2 , ar = 8 , ar² = 32 : find the three terms for r = 4
a = 32 , ar = 8 , ar² = 2 : find the three terms for r = 1/4

500

Find the x and y intercepts of the line with equation

3y - 6 = 3?

(0 , 3)

500

The lengths of side AB and side BC of a scalene triangle ABC are 12 cm and 8 cm respectively. The size of angle C is 59°. Find the length of side AC (rounded to one decimal place).

x = 14.0

500

Find the equation y = a x² + x of the parabola that is tangent to the line with equation y = 3 x + 1.

y = -x² + x

500

Solve the trigonometric equation given by
sin(x) + sin(x/2) = 0 for 0 ≤ x ≤ 2 pi

x = 0, x = 4pi/3 and x = 2pi