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What does w equal in the equation -7w plus 3(w plus 2) -14?
whats w stand for? -7w + 3(w+2)= -14
W3 plus 27 factor completely?
(w + 3)(w^2 - 3w + 9)
What is a formula for a perimeter and area of a rectangle and of a parallelagram?
Perimeter: (2*L)+(2*W) [length times two plus width times two] Area: L*W [length times width]
What is 6w2 plus 19w plus 10?
(3w + 2)(2w + 5) so w = -2/3 or -2.5
Formula for length of a rectangle?
a = L x W: area equals length times the width. p = 2L + 2W: perimeter equals 2 times the length plus 2 times the width so L = (p - 2W)/2
What does w equal in the equation -7w plus 3(w plus 2) -14?
whats w stand for? -7w + 3(w+2)= -14
What is the answer of (w plus 7)(w plus 3)?
As a quadratic expression it is: w^2 +10w +21
Reduce the fraction w2 plus 5w plus 6 over w2-w-12?
(w² + 5w + 6) / (w² - w - 12)= [(w + 2)(w + 3)] / [(w - 4)(w + 3)]= (w + 2) / (w - 4)
What is the shown work of w plus 3 over 2 is greater than 6?
w + 3/2 > 6 Subtract 3/2 from both sides: w > 6- 3/2 = 41/2
If x equals 2 and y equals 3 and z equals 6 then what is the value of w if w equals xyz?
If x = 2 and y = 3 and z = 6 then the value of w if w = xyz is 36. (2 times 3 times 6)
W3 plus 27 factor completely?
(w + 3)(w^2 - 3w + 9)
What is a formula for a perimeter and area of a rectangle and of a parallelagram?
Perimeter: (2*L)+(2*W) [length times two plus width times two] Area: L*W [length times width]
Evaluate t-7over w for t equals -3 and w equals -2?
To evaluate t-7 over w for t equals -3 and w equals -2, we substitute -3 for t and -2 for w in the expression. This gives us (-3) - 7 over (-2), which simplifies to -10 over -2. Further simplifying, we get 5 as the final result.
What is 6w2 plus 19w plus 10?
(3w + 2)(2w + 5) so w = -2/3 or -2.5
6 3v plus w?
The simple form for the equation 6 = 3v + w is 3(v-2) + w = 0.
How do you write 3 plus w in words?
Three plus w.
How do you solve the equation 3w squared-8w plus 4 equals 0 when there is no greatest common factor?
3w^2 - 8w + 4 = (3w -2) (w-2) So 3w-2=0, then 3w=2, so w=2/3, w-2=0, so w=2. Your solutions are w=2/3 and w=2.
