Rational Expressions Jeopardy Template

Wild Card

Simplify Rational Expressions

Multiply Rational Expressions

Divide Rational Expressions

Add/Subtract Rational Expressions

Is it rational?

100

What is the excluded value(s)?

5/x

x = 0

100

(16c^2b^4)/(8c^3b)

(2b^3)/(c); c≠0

100

(2x^3)/(7x) xx 14/x

4x; x≠0

100

(x^5)/y div x/y^2

x^4y

100

(3-2n)/(n(n+2)) - (1-3n)/(n(n+2)

1/n ; n≠0,-2

100

2/6

Yes; 2 and 6 are both integers and a rational expression is any expression that can be expressed as an integer divided by an integer.

200

"______, ______, ______" is a method used to divide rational expressions by setting the problem up with multiplication.

KEEP, CHANGE, FLIP

200

(n+3)/(n^2+10n+21)

1/(n+7); n≠-3, -7

200

(10n^2)/4 xx 2/n

5n; n≠0

200

(n^2+7n+12)/(16n^2) div (n+3)/(2n)

(n+4)/(8n); n≠-3,0

200

c/(c^2+3c-4)-1/(c^2+3c-4)

1/(c+4); c≠-4,1

200

log(28)

No; log(28) can never be expressed as an integer divided by an integer, because when evaluated it's decimal place never terminates.

300

What is a rational expression?

A ratio of two polynomials.

300

Simplify the rational expression

(y^2+9y-10)/(2y+20)

(y-1)/2; y≠-10

300

(12c^3)/(21b) xx (14b^2)/(6b)

(4bc^2)/3; b≠0

300

(b+4)/(3b+2) div (3b+12)/(b+1)

(b+1)/((3)(3b+2)); b≠-4,-2/3

300

(6n)/(n+2)+(2n)/(n+7)

(8n^2+46n)/((n+7)(n+2)); n≠-7,-2

300

(2sqrtx)/(5x^5)

No; the square root of x could represent a number with a non-terminating decimal. Rational numbers are expressible by a numerator and a denominator that are both integers.

400

In the expression (x+4)/4 why can't we cancel out the 4's to simplify this expression to equal x?

"4" isn't a factor in the numerator. "4" is only a factor in the denominator. (x+4) is a factor of itself and can not be factored further.

400

Simplify the rational expression

(x^2-2x-35)/(x^2-9x+14)

(x+5)/(x-2); x≠7, 2

400

(n^2+n-2)/(n+2) xx (4n)/(n-1)

4n; n≠1, -2

400

(n^2+14n+48)/(n+1)÷(n+8)

(n+6)/(n+1); n≠-6,-1

400

(6)/(3x-24)-(7)/(x-7)

(-5x+42)/((x-8)(x-7)); x≠8,-7

400

x⁴+360

Yes; this expression can always be expressed by an integer divided by an integer, regardless of the value of x.

500

What are the excluded value(s)?

(x^2-x-6)/(x^2+8x+12)

x = -6 and -2

500

Simplify the rational expression

(5d+15)/(d^2-d-12)

5/(d-4); d≠4, -3

500

(y^2-1)/(y^2-49) xx (y-7)/(y+1)

(y-1)/(y+7); y≠-1, 7,-7

500

(6k^2)/(6+5k-k^2)÷(k-3)/(k^2-5k-6)

-(6k^2)/(k-3); k≠3, 6,-1

500

(4)/(3b+1)-(6b)/(4b+4)

(-9b^2+5b+8)/(2(b+1)(3b+1)); n≠-1, -1/3

500

(-4x^3-3x+5)/(31x^2+4x+600)

Yes; regardless of the value of x the expression will represent an integer divided by another integer.