The sum of the measure of angle M and angle L is 116°.

To find the measure of angle L, we need to solve the equation:

50° + (7x - 4)° = 116°

Adding like terms, we have:

7x + 50 - 4 = 116

Combining like terms, we get:

7x + 46 = 116

Subtracting 46 from both sides, we have:

7x = 70

Dividing both sides by 7, we get:

x = 10

Therefore, the measure of angle L is (7x - 4)° = (7 * 10 - 4)° = 70°. Answer: \boxed{70}.

Nope

Apologies for the incorrect answer.

Given that the sum of the measures of angles M and L is 116°, and the measure of angle M is 50°, let's set up the equation to find the measure of angle L:

M + L = 116

Substituting the known values:

50 + L = 116

Now we can solve for L:

L = 116 - 50

L = 66

Therefore, the measure of angle L is 66°. Answer: \boxed{66}.

The answears are
10
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15
20

Apologies for the previous incorrect answer. Let's solve it correctly.

Given that the sum of the measures of angles M and L is 116°, and the measure of angle M is 50°, and the measure of angle L is (7x – 4)°, let's set up the equation:

M + L = 116

Substituting the known values:

50 + (7x – 4) = 116

Simplifying the equation:

7x - 4 + 50 = 116

Combining like terms:

7x + 46 = 116

Subtracting 46 from both sides:

7x = 116 - 46

7x = 70

Dividing both sides by 7:

x = 10

Now we can find the measure of angle L:

L = 7x - 4

L = 7(10) - 4

L = 70 - 4

L = 66

Therefore, the measure of angle L is (7x – 4)° = 66°. The value of x is 10.