Slove x²-6x-7=0 x=

The following equation has two different solutions. Solve the equation and place one solution in each answer box. The LARGER answer goes in Box1. The SMALLER solution should go in Box2. Solve for x: x²+7x+12=0 Box1 (Larger Solution): Box2 (Smaller Solution):

Solve the equation: x²+8x=0

Answer: X=

Write your answers as a list of integers or reduced fractions, with your answers separated by a comma. For example, if you get 4 and -2/3 as your answers, then enter 4,-2/3 in the box.

Solve the equation: m²-49=0

Answer: m =

Write your answers as a list of integers or reduced fractions, with your answers separated by a comma. For example, if you get 4 and -2/3 as your answers, then enter 4,-2/3 in the box.

Solve by completing the square. List the solutions, separated by commas.

-2x²+16x+40=0

x=

Solve the equation x²+7x-9=0 by completing the square. There are two solutions A and B where A

Find all real solutions of the equation by first factoring the left hand side and then taking a square root: x²-14x+49=16.

x₁= and x₂=

Use the square root property to determine all real solutions for each of the following equations.

4a²+48=0

a=

5²-400=0

=

Give exact solutions (don't use decimals), and separate multiple solutions with commas. If there are no real solutions, type DNE.

Find all real solutions of the equation.

(r-5)²=36

r=

Fully simplify your solutions and separate multiple solutions with commas.

Find all real solutions of the equation.

(2j-8)²-144=0

j=

Leave answers that include radicals as a single fraction, and separate multiple solutions with commas.

Solve the equation: 3x²=-5x+2. Fully simplify your answer, including any non-real solutions.

Solve for x by using the quadratic formula. If you have multiple solutions, list them separated by commas.

9x²+12x=-6

Perform the indicated operations & simplify. Add: (24-25i)+(4+21i) sum = Subtract: (24-25i)-(4+21i) difference =

Find the product of (4-10i) and its conjugate. product

Find the product of -4+3i and its conjugate. The answer is a+bi where The real number a equals The real number b equals