Equations - ISEE Upper Level Quantitative Reasoning

Card 0 of 1416

Question

Solve for :

$x\left (3x+7 \right ) =20$

Answer

First, rewrite the quadratic equation in standard form by distributing the through the product on the left, then collecting all of the terms on the left side:

$x\left (3x+7 \right ) =20$

$x\left \cdot ; 3x+x\left \cdot; 7 =20$

$3x ^{2}+7x =20$

$3x ^{2}+7x -20=20 -20$

$3x ^{2}+7x -20=0$

Use the method to factor the quadratic expression $3x ^{2}+7x -20$ ; we are looking to split the linear term by finding two integers whose sum is 7 and whose product is . These integers are , so:

$\left (3x ^{2}-5x \right ) + \left ( 12x -20 \right ) =0$

$x \left (3x-5 \right ) +4 \left ( 3x -5 \right ) =0$

$\left (x +4 \right )\left (3x-5 \right )=0$

Set each expression equal to 0 and solve:

or

$x = \frac{5}{3} = 1\frac{2}{3}$

The solution set is $\left \{ -4, 1\frac{2}{3}\right \}$ .

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Question

Solve for :

$x\left (3x+7 \right ) =20$

Answer

First, rewrite the quadratic equation in standard form by distributing the through the product on the left, then collecting all of the terms on the left side:

$x\left (3x+7 \right ) =20$

$x\left \cdot ; 3x+x\left \cdot; 7 =20$

$3x ^{2}+7x =20$

$3x ^{2}+7x -20=20 -20$

$3x ^{2}+7x -20=0$

Use the method to factor the quadratic expression $3x ^{2}+7x -20$ ; we are looking to split the linear term by finding two integers whose sum is 7 and whose product is . These integers are , so:

$\left (3x ^{2}-5x \right ) + \left ( 12x -20 \right ) =0$

$x \left (3x-5 \right ) +4 \left ( 3x -5 \right ) =0$

$\left (x +4 \right )\left (3x-5 \right )=0$

Set each expression equal to 0 and solve:

or

$x = \frac{5}{3} = 1\frac{2}{3}$

The solution set is $\left \{ -4, 1\frac{2}{3}\right \}$ .

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Question

Answer

First, rewrite the quadratic equation in standard form by distributing the through the product on the left and collecting all of the terms on the left side:

$x \cdot 2x-x \cdot 9= 35$

$2x ^{2}-9x= 35$

$2x ^{2}-9x-35= 35 -35$

$2x ^{2}-9x-35= 0$

Use the method to factor the quadratic expression $2x ^{2}-9x-35$ ; we are looking to split the linear term by finding two integers whose sum is and whose product is . These integers are , so:

$\left (2x ^{2}-14x \right ) + \left ( 5x-35 \right ) = 0$

$2x \left (x-7 \right ) + 5\left (x-7 \right ) = 0$

$\left (2x+ 5 \right ) \left (x-7 \right ) = 0$

Set each expression equal to 0 and solve:

$x = - \frac{5}{2} = -2 \frac{1}{2}$

or

The solution set is $\left \{ -2 \frac{1}{2}, 7\right \}$ .

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Question

Answer

First, rewrite the quadratic equation in standard form by FOILing out the product on the left, then collecting all of the terms on the left side:

$2x \cdot x+ 2x \cdot 4 -7\cdot x -7\cdot 4 = 27$

$2x^{2}+ 8x -7 x -28 = 27$

$2x^{2}+ x -28 = 27$

$2x^{2}+ x -28-27 = 27-27$

$2x^{2}+ x- 55 = 0$

Use the method to split the middle term into two terms; we want the coefficients to have a sum of 1 and a product of . These numbers are , so we do the following:

$2x^{2}-10x+ 11x- 55 = 0$

$2x\left (x- 5 \right) + 11 \left ( x- 5 \right) = 0$

$\left (2x+ 11 \right) \left ( x- 5 \right) = 0$

Set each expression equal to 0 and solve:

$x = -5\frac{1}{2}$

or

The solution set is $\left \{ -5 \frac{1}{2}, 5\right \}$ .

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Question

Define $f (x) = \sqrt{14 - 2x}$ and $g(x) = \sqrt{3x - 21}$

What is the domain of the function ?

Answer

$f (x) = \sqrt{14 - 2x}$ has as its domain the set of values of for which its radicand is nonnegative; that is,

$14 - 2x \geq 0$

$14 - 2x- 14 \geq 0 - 14$

$- 2x \geq - 14$

$- 2x \div (-2) \leq - 14 \div (-2)$

$x \leq 7$ or $(- \infty, 7]$

Similarly, $g(x) = \sqrt{3x - 21}$ has as its domain the set of values of for which its radicand is nonnegative; that is,

$3x - 21 \geq 0$

$3x - 21+ 21 \geq 0 + 21$

$3x \geq 21$

$3x \div 3 \geq 21 \div 3$

$x \geq 7$ or $[7,\infty )$

The domain of the sum of two functions is the intersection of the domains of the two individual functions. This intersection is

$(- \infty, 7] \cap [7,\infty ) = \left \{ 7\right \}$

The domain of is the single value $\left \{ 7\right \}$ , which is not among the choices.

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Question

Above is the graph of a function . and . Which is the greater quantity?

(a)

(b)

Answer

Examine this diagram:

As indicated by the blue circle in the diagram, the only point on the graph of the function with domain element 4 is , so , and .

As indicated by the red circles in the diagram, there are three points on the graph of the function with range element 4 - namely, , , and . Therefore, $B \in \left \{ -6, -4, 8 \right \}$ . It is unclear whether or without further information.

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Question

Solve for :

$x\left (3x+7 \right ) =20$

Answer

First, rewrite the quadratic equation in standard form by distributing the through the product on the left, then collecting all of the terms on the left side:

$x\left (3x+7 \right ) =20$

$x\left \cdot ; 3x+x\left \cdot; 7 =20$

$3x ^{2}+7x =20$

$3x ^{2}+7x -20=20 -20$

$3x ^{2}+7x -20=0$

Use the method to factor the quadratic expression $3x ^{2}+7x -20$ ; we are looking to split the linear term by finding two integers whose sum is 7 and whose product is . These integers are , so:

$\left (3x ^{2}-5x \right ) + \left ( 12x -20 \right ) =0$

$x \left (3x-5 \right ) +4 \left ( 3x -5 \right ) =0$

$\left (x +4 \right )\left (3x-5 \right )=0$

Set each expression equal to 0 and solve:

or

$x = \frac{5}{3} = 1\frac{2}{3}$

The solution set is $\left \{ -4, 1\frac{2}{3}\right \}$ .

Compare your answer with the correct one above

Question

Solve for :

$x^{2} -10x = 24$

Answer

First, rewrite the quadratic equation in standard form by moving all nonzero terms to the left:

$x^{2} -10x = 24$

$x^{2} -10x -24= 24-24$

$x^{2} -10x -24= 0$

Now factor the quadratic expression $x^{2} -10x -24$ into two binomial factors , replacing the question marks with two integers whose product is and whose sum is . These numbers are , so:

$x-12 = 0 \Rightarrow x = 12$

or

$x+2 = 0 \Rightarrow x = -2$

The solution set is $\left \{ -2,12\right \}$ .

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Question

Solve for :

$\left ( x-3\right )(2x-1) = 18$

Answer

First, rewrite the quadratic equation in standard form by FOILing out the product on the left, then collecting all of the terms on the left side:

$\left ( x-3\right )(2x-1) = 18$

$x\cdot 2x -x\cdot 1 -3 \cdot 2x +3\cdot 1= 18$

$2x^{2} -x -6x +3= 18$

$2x^{2} -7x +3= 18$

$2x^{2} -7x +3-18= 18 -18$

$2x^{2} -7x -15= 0$

Use the method to factor the quadratic expression $2x^{2} -7x -15$ ; we are looking to split the linear term by finding two integers whose sum is and whose product is . These integers are , so:

$(2x^{2} -10x)+(3x -15)= 0$

$\left (2x +3 \right) \left ( x-5 \right )= 0$

Set each expression equal to 0 and solve:

$x = -\frac{3}{2} = -1\frac{1}{2}$

or

The solution set is $\left \{ - 1 \frac{1}{2}, 5\right \}$ .

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Question

Solve for :

$\left | 5 - \frac{2}{3} t \right | = 15$

Answer

$\left | 5 - \frac{2}{3} t \right | = 15$ can be rewritten as a compound equation:

$5-\frac{2}{3} t = -15 \textrm{ or } 5-\frac{2}{3} t = 15$

Solve them separately:

$5 - \frac{2}{3} t = 15$

$5 - \frac{2}{3} t -5 = 15 -5$

$- \frac{2}{3} t = 10$

$- \frac{2}{3} t \cdot\left ( - \frac{3} {2} \right )= 10 \cdot\left ( - \frac{3} {2} \right )$

$t = - \frac{30} {2} = -15$

or

$5-\frac{2}{3} t = -15$

$5 - \frac{2}{3} t -5 = -15 -5$

$- \frac{2}{3} t = -20$

$- \frac{2}{3} t\cdot\left ( - \frac{3} {2} \right ) = -20\cdot\left ( - \frac{3} {2} \right )$

$t =\frac{60} {2} = 30$

The solution set is $\left \{ -15, 30\right \}$ .

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Question

Which of the following is the solution set of this equation?

$\left | 2t - \frac{1}{4} \right | = \frac{5}{8}$

Answer

Rewrite the fractions in decimal form:

$\left | 2t - \frac{1}{4} \right | = \frac{5}{8}$

$\left | 2t - 0.25 \right | = 0.625$

Now rewrite this as a compound statement and solve each part:

$2t - 0.25=- 0.625 \textrm{ or }2t - 0.25= 0.625$

$2t \div 2 = -0.375\div 2$

or

$2t \div 2 = 0.875 \div 2$

The solution set is $\left \{ -0.1875, 0.4375 \right \}$ .

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Question

Answer

First, rewrite the quadratic equation in standard form by distributing the through the product on the left and collecting all of the terms on the left side:

$x \cdot 2x-x \cdot 9= 35$

$2x ^{2}-9x= 35$

$2x ^{2}-9x-35= 35 -35$

$2x ^{2}-9x-35= 0$

Use the method to factor the quadratic expression $2x ^{2}-9x-35$ ; we are looking to split the linear term by finding two integers whose sum is and whose product is . These integers are , so:

$\left (2x ^{2}-14x \right ) + \left ( 5x-35 \right ) = 0$

$2x \left (x-7 \right ) + 5\left (x-7 \right ) = 0$

$\left (2x+ 5 \right ) \left (x-7 \right ) = 0$

Set each expression equal to 0 and solve:

$x = - \frac{5}{2} = -2 \frac{1}{2}$

or

The solution set is $\left \{ -2 \frac{1}{2}, 7\right \}$ .

Compare your answer with the correct one above

Question

Answer

First, rewrite the quadratic equation in standard form by FOILing out the product on the left, then collecting all of the terms on the left side:

$2x \cdot x+ 2x \cdot 4 -7\cdot x -7\cdot 4 = 27$

$2x^{2}+ 8x -7 x -28 = 27$

$2x^{2}+ x -28 = 27$

$2x^{2}+ x -28-27 = 27-27$

$2x^{2}+ x- 55 = 0$

Use the method to split the middle term into two terms; we want the coefficients to have a sum of 1 and a product of . These numbers are , so we do the following:

$2x^{2}-10x+ 11x- 55 = 0$

$2x\left (x- 5 \right) + 11 \left ( x- 5 \right) = 0$

$\left (2x+ 11 \right) \left ( x- 5 \right) = 0$

Set each expression equal to 0 and solve:

$x = -5\frac{1}{2}$

or

The solution set is $\left \{ -5 \frac{1}{2}, 5\right \}$ .

Compare your answer with the correct one above

Question

Define $f (x) = \sqrt{14 - 2x}$ and $g(x) = \sqrt{3x - 21}$

What is the domain of the function ?

Answer

$f (x) = \sqrt{14 - 2x}$ has as its domain the set of values of for which its radicand is nonnegative; that is,

$14 - 2x \geq 0$

$14 - 2x- 14 \geq 0 - 14$

$- 2x \geq - 14$

$- 2x \div (-2) \leq - 14 \div (-2)$

$x \leq 7$ or $(- \infty, 7]$

Similarly, $g(x) = \sqrt{3x - 21}$ has as its domain the set of values of for which its radicand is nonnegative; that is,

$3x - 21 \geq 0$

$3x - 21+ 21 \geq 0 + 21$

$3x \geq 21$

$3x \div 3 \geq 21 \div 3$

$x \geq 7$ or $[7,\infty )$

The domain of the sum of two functions is the intersection of the domains of the two individual functions. This intersection is

$(- \infty, 7] \cap [7,\infty ) = \left \{ 7\right \}$

The domain of is the single value $\left \{ 7\right \}$ , which is not among the choices.

Compare your answer with the correct one above

Question

Above is the graph of a function . and . Which is the greater quantity?

(a)

(b)

Answer

Examine this diagram:

As indicated by the blue circle in the diagram, the only point on the graph of the function with domain element 4 is , so , and .

As indicated by the red circles in the diagram, there are three points on the graph of the function with range element 4 - namely, , , and . Therefore, $B \in \left \{ -6, -4, 8 \right \}$ . It is unclear whether or without further information.

Compare your answer with the correct one above

Question

Solve for :

$x\left (3x+7 \right ) =20$

Answer

First, rewrite the quadratic equation in standard form by distributing the through the product on the left, then collecting all of the terms on the left side:

$x\left (3x+7 \right ) =20$

$x\left \cdot ; 3x+x\left \cdot; 7 =20$

$3x ^{2}+7x =20$

$3x ^{2}+7x -20=20 -20$

$3x ^{2}+7x -20=0$

Use the method to factor the quadratic expression $3x ^{2}+7x -20$ ; we are looking to split the linear term by finding two integers whose sum is 7 and whose product is . These integers are , so:

$\left (3x ^{2}-5x \right ) + \left ( 12x -20 \right ) =0$

$x \left (3x-5 \right ) +4 \left ( 3x -5 \right ) =0$

$\left (x +4 \right )\left (3x-5 \right )=0$

Set each expression equal to 0 and solve:

or

$x = \frac{5}{3} = 1\frac{2}{3}$

The solution set is $\left \{ -4, 1\frac{2}{3}\right \}$ .

Compare your answer with the correct one above

Question

Solve for :

$x^{2} -10x = 24$

Answer

First, rewrite the quadratic equation in standard form by moving all nonzero terms to the left:

$x^{2} -10x = 24$

$x^{2} -10x -24= 24-24$

$x^{2} -10x -24= 0$

Now factor the quadratic expression $x^{2} -10x -24$ into two binomial factors , replacing the question marks with two integers whose product is and whose sum is . These numbers are , so:

$x-12 = 0 \Rightarrow x = 12$

or

$x+2 = 0 \Rightarrow x = -2$

The solution set is $\left \{ -2,12\right \}$ .

Compare your answer with the correct one above

Question

Solve for :

$\left ( x-3\right )(2x-1) = 18$

Answer

First, rewrite the quadratic equation in standard form by FOILing out the product on the left, then collecting all of the terms on the left side:

$\left ( x-3\right )(2x-1) = 18$

$x\cdot 2x -x\cdot 1 -3 \cdot 2x +3\cdot 1= 18$

$2x^{2} -x -6x +3= 18$

$2x^{2} -7x +3= 18$

$2x^{2} -7x +3-18= 18 -18$

$2x^{2} -7x -15= 0$

Use the method to factor the quadratic expression $2x^{2} -7x -15$ ; we are looking to split the linear term by finding two integers whose sum is and whose product is . These integers are , so:

$(2x^{2} -10x)+(3x -15)= 0$

$\left (2x +3 \right) \left ( x-5 \right )= 0$

Set each expression equal to 0 and solve:

$x = -\frac{3}{2} = -1\frac{1}{2}$

or

The solution set is $\left \{ - 1 \frac{1}{2}, 5\right \}$ .

Compare your answer with the correct one above

Question

Solve for :

$\left | 5 - \frac{2}{3} t \right | = 15$

Answer

$\left | 5 - \frac{2}{3} t \right | = 15$ can be rewritten as a compound equation:

$5-\frac{2}{3} t = -15 \textrm{ or } 5-\frac{2}{3} t = 15$

Solve them separately:

$5 - \frac{2}{3} t = 15$

$5 - \frac{2}{3} t -5 = 15 -5$

$- \frac{2}{3} t = 10$

$- \frac{2}{3} t \cdot\left ( - \frac{3} {2} \right )= 10 \cdot\left ( - \frac{3} {2} \right )$

$t = - \frac{30} {2} = -15$

or

$5-\frac{2}{3} t = -15$

$5 - \frac{2}{3} t -5 = -15 -5$

$- \frac{2}{3} t = -20$

$- \frac{2}{3} t\cdot\left ( - \frac{3} {2} \right ) = -20\cdot\left ( - \frac{3} {2} \right )$

$t =\frac{60} {2} = 30$

The solution set is $\left \{ -15, 30\right \}$ .

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Question

Which of the following is the solution set of this equation?

$\left | 2t - \frac{1}{4} \right | = \frac{5}{8}$

Answer

Rewrite the fractions in decimal form:

$\left | 2t - \frac{1}{4} \right | = \frac{5}{8}$

$\left | 2t - 0.25 \right | = 0.625$

Now rewrite this as a compound statement and solve each part:

$2t - 0.25=- 0.625 \textrm{ or }2t - 0.25= 0.625$

$2t \div 2 = -0.375\div 2$

or

$2t \div 2 = 0.875 \div 2$

The solution set is $\left \{ -0.1875, 0.4375 \right \}$ .

Compare your answer with the correct one above

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