Equation Problems (Geometry) 1
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Question 1 of 5
1. Question
Find `x`
- `x=` (11)
Hint
Help VideoCorrect
Great Work!
Incorrect
Inverse Operations
When moving a term to the other side of an equation, the operation is inversed.Notice that the full angle has a square marker, which means it is a right angle and measures `90°`.Form an equation knowing that the two smaller angles are complementary and add up to `90°`.
Right Angle`=90°`Small Angle `1=4x°`Small Angle `2=46°`Small Angle `1` `+`Small Angle `2` `=` Right Angle `4x` `+``46` `=` `90` Substitute the values To solve for `x`, it needs to be alone on one side.Start by moving `46` to the other side by subtracting `46` from both sides of the equation.`4``x` `+46` `=` `90` `4``x` `+46` `-46` `=` `90` `-46` `4``x` `=` `44` `46-46` cancels out Finally, remove `4` by dividing both sides of the equation by `4`.`4``x` `=` `44` `4``x``divide4` `=` `44``divide4` `x` `=` `11` `4divide4` cancels out Check our workTo confirm our answer, substitute `x=11` to the formed equation.`4x+46` `=` `90` `4(11)+46` `=` `90` Substitute `x=11` `44+46` `=` `90` `90` `=` `90` Since the equation is true, the answer is correct.`x=11` -
Question 2 of 5
2. Question
Find `x`
- `x=` (16)
Hint
Help VideoCorrect
Good Job!
Incorrect
Inverse Operations
When moving a term to the other side of an equation, the operation is inversed.A straight angle measures `180°`.Form an equation knowing that the two smaller angles are supplementary and add up to `180°`.
Straight Angle`=180°`Small Angle `1=148°`Small Angle `2=2x°`Small Angle `1` `+`Small Angle `2` `=` Straight Angle `148` `+``2x` `=` `180` Substitute the values `2x+148` `=` `180` To solve for `x`, it needs to be alone on one side.Start by moving `148` to the other side by subtracting `148` from both sides of the equation.`2``x` `+148` `=` `180` `2``x` `+148` `-148` `=` `180` `-148` `2``x` `=` `32` `148-148` cancels out Finally, remove `2` by dividing both sides of the equation by `2`.`2``x` `=` `32` `2``x``divide2` `=` `32``divide2` `x` `=` `16` `2divide2` cancels out Check our workTo confirm our answer, substitute `x=16` to the formed equation.`2x+148` `=` `180` `2(16)+148` `=` `180` Substitute `x=16` `32+148` `=` `180` `180` `=` `180` Since the equation is true, the answer is correct.`x=16` -
Question 3 of 5
3. Question
Find `x`
- `x=` (28)
Hint
Help VideoCorrect
Well Done!
Incorrect
Inverse Operations
When moving a term to the other side of an equation, the operation is inversed.A straight angle measures `180°`.Form an equation knowing that the three angles are supplementary and add up to `180°`.
Straight Angle`=180°`Angle `1=50°`Angle `2=3x°`Angle `3=(2x-10)°`Angle `1` `+`Angle `2` `+`Angle `3` `=` Straight Angle `50` `+``3x` `+``(2x-10)` `=` `180` Substitute the values `5x+40` `=` `180` Simplify To solve for `x`, it needs to be alone on one side.Start by moving `40` to the other side by subtracting `40` from both sides of the equation.`5``x` `+40` `=` `180` `5``x` `+40` `-40` `=` `180` `-40` `5``x` `=` `140` `40-40` cancels out Finally, remove `5` by dividing both sides of the equation by `5`.`5``x` `=` `140` `5``x``divide5` `=` `140``divide5` `x` `=` `28` `5divide5` cancels out Check our workTo confirm our answer, substitute `x=28` to the formed equation.`50+3x+(2x-10)` `=` `180` `50+3(28)+(2(28)-10)` `=` `180` Substitute `x=28` `50+84+(56-10)` `=` `180` `50+84+46` `=` `180` `180` `=` `180` Since the equation is true, the answer is correct.`x=28` -
Question 4 of 5
4. Question
Find `x`
- `x=` (80)
Hint
Help VideoCorrect
Fantastic!
Incorrect
Inverse Operations
When moving a term to the other side of an equation, the operation is inversed.Vertically Opposite Angles
Alternate Angles
Corresponding Angles
Form an equation knowing that vertically opposite angles are equal.
`2x-30` `=` `x+50` To solve for `x`, it needs to be alone on one side.Start by moving `x` to the other side by subtracting `x` from both sides of the equation.`2``x` `-30` `=` `x` `+50` `2``x` `-30` `-x` `=` `x` `+50` `-x` `x` `-30` `=` `50` `x-x` cancels out Finally, move `30` to the other side by adding `30` to both sides of the equation.`x` `-30` `=` `50` `x` `-30` `+30` `=` `50` `+30` `x` `=` `80` `-30+30` cancels out Check our workTo confirm our answer, substitute `x=80` to the formed equation.`2x-30` `=` `x+50` `2(80)-30` `=` `80+50` Substitute `x=80` `160-30` `=` `130` `130` `=` `130` Since the equation is true, the answer is correct.`x=80` -
Question 5 of 5
5. Question
Find `x`
- `x=` (64)
Hint
Help VideoCorrect
Excellent!
Incorrect
Inverse Operations
When moving a term to the other side of an equation, the operation is inversed.A revolution measures `360°`.Form an equation knowing that the three angles form a revolution.
Revolution`=360°`Angle `1=x°`Angle `2=3x°`Angle `3=(x+40)°`Angle `1` `+`Angle `2` `+`Angle `3` `=` Revolution `x` `+``3x` `+``(x+40)` `=` `360` Substitute the values `5x+40` `=` `360` Simplify To solve for `x`, it needs to be alone on one side.Start by moving `40` to the other side by subtracting `40` from both sides of the equation.`5``x` `+40` `=` `360` `5``x` `+40` `-40` `=` `360` `-40` `5``x` `=` `320` `40-40` cancels out Finally, remove `5` by dividing both sides of the equation by `5`.`5``x` `=` `320` `5``x``divide5` `=` `320``divide5` `x` `=` `64` `5divide5` cancels out Check our workTo confirm our answer, substitute `x=64` to the formed equation.`x+3x+(x+40)` `=` `360` `64+3(64)+(64+40)` `=` `360` Substitute `x=64` `64+192+104` `=` `360` `360` `=` `360` Since the equation is true, the answer is correct.`x=64`
Quizzes
- One Step Equations – Add and Subtract 1
- One Step Equations – Add and Subtract 2
- One Step Equations – Add and Subtract 3
- One Step Equations – Add and Subtract 4
- One Step Equations – Multiply and Divide 1
- One Step Equations – Multiply and Divide 2
- One Step Equations – Multiply and Divide 3
- One Step Equations – Multiply and Divide 4
- Two Step Equations 1
- Two Step Equations 2
- Two Step Equations 3
- Two Step Equations 4
- Multi-Step Equations 1
- Multi-Step Equations 2
- Solve Equations using the Distributive Property 1
- Solve Equations using the Distributive Property 2
- Solve Equations using the Distributive Property 3
- Equations with Variables on Both Sides 1
- Equations with Variables on Both Sides 2
- Equations with Variables on Both Sides 3
- Equations with Variables on Both Sides (Fractions) 1
- Equations with Variables on Both Sides (Fractions) 2
- Solve Equations with Variables on Both Sides using the Distributive Property 1
- Solve Equations with Variables on Both Sides using the Distributive Property 2
- Solve Equations with Variables on Both Sides using the Distributive Property 3
- Solve Equations with Variables on Both Sides using the Distributive Property 4
- Equation Word Problems 1
- Equation Word Problems 2
- Equation Word Problems 3
- Equation Word Problems 4
- Equation Word Problems (Age)
- Equation Word Problems (Money)
- Equation Word Problems (Harder)
- Equation Problems with Substitution
- Equation Problems (Geometry) 1
- Equation Problems (Geometry) 2
- Equation Problems (Perimeter)
- Equation Problems (Area)
- Change the Subject of an Equation 1
- Change the Subject of an Equation 2
- Change the Subject of an Equation 3