How do you solve #2< 6/5c+14#?

Switch sides.

To solve (2 < \frac{6}{5}c + 14):

1. Subtract 14 from both sides to isolate the term with (c):

[2 - 14 < \frac{6}{5}c]

2. Simplify the left side:

[-12 < \frac{6}{5}c]

3. To isolate (c), multiply both sides by (\frac{5}{6}), the reciprocal of (\frac{6}{5}), to cancel out the fraction:

[\frac{5}{6}(-12) < c]

4. Simplify:

[-10 < c]

So, the solution is (c > -10).

To solve (2 < \frac{6}{5}c + 14), first subtract (14) from both sides to isolate the fraction:

(2 - 14 < \frac{6}{5}c)

Simplify:

(-12 < \frac{6}{5}c)

Next, multiply both sides by (\frac{5}{6}) to solve for (c):

(-12 \times \frac{5}{6} < c)

(-10 < c)

So, the solution to the inequality is (c > -10).

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31. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c + 14 - 14 ] [ -12 < \frac{6}{5}c ]

32. Multiply both sides by ( \frac{5}{6To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

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37. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c ] [ -12 < \frac{6}{5}c ]

38. To isolate ( c ), multiply both sides by ( \frac{5}{6} ) (the reciprocal ofTo solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

39. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c + 14 - 14 ] [ -12 < \frac{6}{5}c ]

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43. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c + 14 - 14 ] [ -12 < \frac{6}{5}c ]

44. Multiply both sides by ( \frac{5}{6} )To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

45. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c ] [ -12 < \frac{6}{5}c ]

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53. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c ] [ -12 < \frac{6}{5}c ]

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55. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c + 14 - 14 ] [ -12 < \frac{6}{5}c ]

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58. To isolate ( c ), multiply both sides by ( \frac{5}{6} ) (the reciprocal of ( \frac{6}{5} )): To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

59. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c + 14 - 14 ] [ -12 < \frac{6}{5}c ]

60. Multiply both sides by ( \frac{5}{6} ) to isolate ( cTo solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

61. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c ] [ -12 < \frac{6}{5}c ]

62. To isolate ( c ), multiply both sides by ( \frac{5}{6} ) (the reciprocal of ( \frac{6}{5} )): [To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

63. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c + 14 - 14 ] [ -12 < \frac{6}{5}c ]

64. Multiply both sides by ( \frac{5}{6} ) to isolate ( c ): To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

65. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c ] [ -12 < \frac{6}{5}c ]

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67. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c + 14 - 14 ] [ -12 < \frac{6}{5}c ]

68. Multiply both sides by ( \frac{5}{6} ) to isolate ( c ): To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

69. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c ] [ -12 < \frac{6}{5}c ]

70. To isolate ( c ), multiply both sides by ( \frac{5}{6} ) (the reciprocal of ( \frac{6}{5} )): [ \fracTo solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

71. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c + 14 - 14 ] [ -12 < \frac{6}{5}c ]

72. Multiply both sides by ( \frac{5}{6} ) to isolate ( c ): [ \To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

73. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c ] [ -12 < \frac{6}{5}c ]

74. To isolate ( c ), multiply both sides by ( \frac{5}{6} ) (the reciprocal of ( \frac{6}{5} )): [ \frac{To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

75. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c + 14 - 14 ] [ -12 < \frac{6}{5}c ]

76. Multiply both sides by ( \frac{5}{6} ) to isolate ( c ): [ \frac{To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

77. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c ] [ -12 < \frac{6}{5}c ]

78. To isolate ( c ), multiply both sides by ( \frac{5}{6} ) (the reciprocal of ( \frac{6}{5} )): [ \frac{5To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

79. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c + 14 - 14 ] [ -12 < \frac{6}{5}c ]

80. Multiply both sides by ( \frac{5}{6} ) to isolate ( c ): [ \frac{5}{To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

81. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c ] [ -12 < \frac{6}{5}c ]

82. To isolate ( c ), multiply both sides by ( \frac{5}{6} ) (the reciprocal of ( \frac{6}{5} )): [ \frac{5}{To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

83. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c + 14 - 14 ] [ -12 < \frac{6}{5}c ]

84. Multiply both sides by ( \frac{5}{6} ) to isolate ( c ): [ \frac{5}{6}To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

85. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c ] [ -12 < \frac{6}{5}c ]

86. To isolate ( c ), multiply both sides by ( \frac{5}{6} ) (the reciprocal of ( \frac{6}{5} )): [ \frac{5}{6To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

87. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c + 14 - 14 ] [ -12 < \frac{6}{5}c ]

88. Multiply both sides by ( \frac{5}{6} ) to isolate ( c ): [ \frac{5}{6} \To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

89. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c ] [ -12 < \frac{6}{5}c ]

90. To isolate ( c ), multiply both sides by ( \frac{5}{6} ) (the reciprocal of ( \frac{6}{5} )): [ \frac{5}{6}To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

91. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c + 14 - 14 ] [ -12 < \frac{6}{5}c ]

92. Multiply both sides by ( \frac{5}{6} ) to isolate ( c ): [ \frac{5}{6} \timesTo solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

93. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c ] [ -12 < \frac{6}{5}c ]

94. To isolate ( c ), multiply both sides by ( \frac{5}{6} ) (the reciprocal of ( \frac{6}{5} )): [ \frac{5}{6} \To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

95. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c + 14 - 14 ] [ -12 < \frac{6}{5}c ]

96. Multiply both sides by ( \frac{5}{6} ) to isolate ( c ): [ \frac{5}{6} \times (-To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

97. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c ] [ -12 < \frac{6}{5}c ]

98. To isolate ( c ), multiply both sides by ( \frac{5}{6} ) (the reciprocal of ( \frac{6}{5} )): [ \frac{5}{6} \cdotTo solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

99. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c + 14 - 14 ] [ -12 < \frac{6}{5}c ]

100. Multiply both sides by ( \frac{5}{6} ) to isolate ( c ): [ \frac{5}{6} \times (-12To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

101. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c ] [ -12 < \frac{6}{5}c ]

102. To isolate ( c ), multiply both sides by ( \frac{5}{6} ) (the reciprocal of ( \frac{6}{5} )): [ \frac{5}{6} \cdot (-To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

103. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c + 14 - 14 ] [ -12 < \frac{6}{5}c ]

104. Multiply both sides by ( \frac{5}{6} ) to isolate ( c ): [ \frac{5}{6} \times (-12)To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

105. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c ] [ -12 < \frac{6}{5}c ]

106. To isolate ( c ), multiply both sides by ( \frac{5}{6} ) (the reciprocal of ( \frac{6}{5} )): [ \frac{5}{6} \cdot (-12To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

107. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c + 14 - 14 ] [ -12 < \frac{6}{5}c ]

108. Multiply both sides by ( \frac{5}{6} ) to isolate ( c ): [ \frac{5}{6} \times (-12) <To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

109. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c ] [ -12 < \frac{6}{5}c ]

110. To isolate ( c ), multiply both sides by ( \frac{5}{6} ) (the reciprocal of ( \frac{6}{5} )): [ \frac{5}{6} \cdot (-12)To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

111. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c + 14 - 14 ] [ -12 < \frac{6}{5}c ]

112. Multiply both sides by ( \frac{5}{6} ) to isolate ( c ): [ \frac{5}{6} \times (-12) < \To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

113. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c ] [ -12 < \frac{6}{5}c ]

114. To isolate ( c ), multiply both sides by ( \frac{5}{6} ) (the reciprocal of ( \frac{6}{5} )): [ \frac{5}{6} \cdot (-12) <To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

115. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c + 14 - 14 ] [ -12 < \frac{6}{5}c ]

116. Multiply both sides by ( \frac{5}{6} ) to isolate ( c ): [ \frac{5}{6} \times (-12) < \fracTo solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

117. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c ] [ -12 < \frac{6}{5}c ]

118. To isolate ( c ), multiply both sides by ( \frac{5}{6} ) (the reciprocal of ( \frac{6}{5} )): [ \frac{5}{6} \cdot (-12) < \To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

119. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c + 14 - 14 ] [ -12 < \frac{6}{5}c ]

120. Multiply both sides by ( \frac{5}{6} ) to isolate ( c ): [ \frac{5}{6} \times (-12) < \frac{To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

121. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c ] [ -12 < \frac{6}{5}c ]

122. To isolate ( c ), multiply both sides by ( \frac{5}{6} ) (the reciprocal of ( \frac{6}{5} )): [ \frac{5}{6} \cdot (-12) < \fracTo solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

123. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c + 14 - 14 ] [ -12 < \frac{6}{5}c ]

124. Multiply both sides by ( \frac{5}{6} ) to isolate ( c ): [ \frac{5}{6} \times (-12) < \frac{6To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

125. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c ] [ -12 < \frac{6}{5}c ]

126. To isolate ( c ), multiply both sides by ( \frac{5}{6} ) (the reciprocal of ( \frac{6}{5} )): [ \frac{5}{6} \cdot (-12) < \frac{To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

127. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c + 14 - 14 ] [ -12 < \frac{6}{5}c ]

128. Multiply both sides by ( \frac{5}{6} ) to isolate ( c ): [ \frac{5}{6} \times (-12) < \frac{6}{To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

129. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c ] [ -12 < \frac{6}{5}c ]

130. To isolate ( c ), multiply both sides by ( \frac{5}{6} ) (the reciprocal of ( \frac{6}{5} )): [ \frac{5}{6} \cdot (-12) < \frac{5To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

131. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c + 14 - 14 ] [ -12 < \frac{6}{5}c ]

132. Multiply both sides by ( \frac{5}{6} ) to isolate ( c ): [ \frac{5}{6} \times (-12) < \frac{6}{5To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

133. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c ] [ -12 < \frac{6}{5}c ]

134. To isolate ( c ), multiply both sides by ( \frac{5}{6} ) (the reciprocal of ( \frac{6}{5} )): [ \frac{5}{6} \cdot (-12) < \frac{5}{6To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

135. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c + 14 - 14 ] [ -12 < \frac{6}{5}c ]

136. Multiply both sides by ( \frac{5}{6} ) to isolate ( c ): [ \frac{5}{6} \times (-12) < \frac{6}{5}c \timesTo solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

137. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c ] [ -12 < \frac{6}{5}c ]

138. To isolate ( c ), multiply both sides by ( \frac{5}{6} ) (the reciprocal of ( \frac{6}{5} )): [ \frac{5}{6} \cdot (-12) < \frac{5}{6}To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

139. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c + 14 - 14 ] [ -12 < \frac{6}{5}c ]

140. Multiply both sides by ( \frac{5}{6} ) to isolate ( c ): [ \frac{5}{6} \times (-12) < \frac{6}{5}c \times \frac{To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

141. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c ] [ -12 < \frac{6}{5}c ]

142. To isolate ( c ), multiply both sides by ( \frac{5}{6} ) (the reciprocal of ( \frac{6}{5} )): [ \frac{5}{6} \cdot (-12) < \frac{5}{6} \To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

143. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c + 14 - 14 ] [ -12 < \frac{6}{5}c ]

144. Multiply both sides by ( \frac{5}{6} ) to isolate ( c ): [ \frac{5}{6} \times (-12) < \frac{6}{5}c \times \frac{5}{To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

145. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c ] [ -12 < \frac{6}{5}c ]

146. To isolate ( c ), multiply both sides by ( \frac{5}{6} ) (the reciprocal of ( \frac{6}{5} )): [ \frac{5}{6} \cdot (-12) < \frac{5}{6} \cdotTo solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

147. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c + 14 - 14 ] [ -12 < \frac{6}{5}c ]

148. Multiply both sides by ( \frac{5}{6} ) to isolate ( c ): [ \frac{5}{6} \times (-12) < \frac{6}{5}c \times \frac{5}{6To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

149. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c ] [ -12 < \frac{6}{5}c ]

150. To isolate ( c ), multiply both sides by ( \frac{5}{6} ) (the reciprocal of ( \frac{6}{5} )): [ \frac{5}{6} \cdot (-12) < \frac{5}{6} \cdot \To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

151. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c + 14 - 14 ] [ -12 < \frac{6}{5}c ]

152. Multiply both sides by ( \frac{5}{6} ) to isolate ( c ): [ \frac{5}{6} \times (-12) < \frac{6}{5}c \times \frac{5}{6}To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

153. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c ] [ -12 < \frac{6}{5}c ]

154. To isolate ( c ), multiply both sides by ( \frac{5}{6} ) (the reciprocal of ( \frac{6}{5} )): [ \frac{5}{6} \cdot (-12) < \frac{5}{6} \cdot \fracTo solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

155. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c + 14 - 14 ] [ -12 < \frac{6}{5}c ]

156. Multiply both sides by ( \frac{5}{6} ) to isolate ( c ): [ \frac{5}{6} \times (-12) < \frac{6}{5}c \times \frac{5}{6} \To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

157. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c ] [ -12 < \frac{6}{5}c ]

158. To isolate ( c ), multiply both sides by ( \frac{5}{6} ) (the reciprocal of ( \frac{6}{5} )): [ \frac{5}{6} \cdot (-12) < \frac{5}{6} \cdot \frac{To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

159. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c + 14 - 14 ] [ -12 < \frac{6}{5}c ]

160. Multiply both sides by ( \frac{5}{6} ) to isolate ( c ): [ \frac{5}{6} \times (-12) < \frac{6}{5}c \times \frac{5}{6} ] To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

161. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c ] [ -12 < \frac{6}{5}c ]

162. To isolate ( c ), multiply both sides by ( \frac{5}{6} ) (the reciprocal of ( \frac{6}{5} )): [ \frac{5}{6} \cdot (-12) < \frac{5}{6} \cdot \frac{6}{To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

163. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c + 14 - 14 ] [ -12 < \frac{6}{5}c ]

164. Multiply both sides by ( \frac{5}{6} ) to isolate ( c ): [ \frac{5}{6} \times (-12) < \frac{6}{5}c \times \frac{5}{6} ] To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

165. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c ] [ -12 < \frac{6}{5}c ]

166. To isolate ( c ), multiply both sides by ( \frac{5}{6} ) (the reciprocal of ( \frac{6}{5} )): [ \frac{5}{6} \cdot (-12) < \frac{5}{6} \cdot \frac{6}{5To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

167. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c + 14 - 14 ] [ -12 < \frac{6}{5}c ]

168. Multiply both sides by ( \frac{5}{6} ) to isolate ( c ): [ \frac{5}{6} \times (-12) < \frac{6}{5}c \times \frac{5}{6} ] \To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

169. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c ] [ -12 < \frac{6}{5}c ]

170. To isolate ( c ), multiply both sides by ( \frac{5}{6} ) (the reciprocal of ( \frac{6}{5} )): [ \frac{5}{6} \cdot (-12) < \frac{5}{6} \cdot \frac{6}{5}To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

171. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c + 14 - 14 ] [ -12 < \frac{6}{5}c ]

172. Multiply both sides by ( \frac{5}{6} ) to isolate ( c ): [ \frac{5}{6} \times (-12) < \frac{6}{5}c \times \frac{5}{6} ] [ -10To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

173. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c ] [ -12 < \frac{6}{5}c ]

174. To isolate ( c ), multiply both sides by ( \frac{5}{6} ) (the reciprocal of ( \frac{6}{5} )): [ \frac{5}{6} \cdot (-12) < \frac{5}{6} \cdot \frac{6}{5}cTo solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

175. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c + 14 - 14 ] [ -12 < \frac{6}{5}c ]

176. Multiply both sides by ( \frac{5}{6} ) to isolate ( c ): [ \frac{5}{6} \times (-12) < \frac{6}{5}c \times \frac{5}{6} ] [ -10 <To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

177. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c ] [ -12 < \frac{6}{5}c ]

178. To isolate ( c ), multiply both sides by ( \frac{5}{6} ) (the reciprocal of ( \frac{6}{5} )): [ \frac{5}{6} \cdot (-12) < \frac{5}{6} \cdot \frac{6}{5}c ] To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

179. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c + 14 - 14 ] [ -12 < \frac{6}{5}c ]

180. Multiply both sides by ( \frac{5}{6} ) to isolate ( c ): [ \frac{5}{6} \times (-12) < \frac{6}{5}c \times \frac{5}{6} ] [ -10 < c \To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

181. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c ] [ -12 < \frac{6}{5}c ]

182. To isolate ( c ), multiply both sides by ( \frac{5}{6} ) (the reciprocal of ( \frac{6}{5} )): [ \frac{5}{6} \cdot (-12) < \frac{5}{6} \cdot \frac{6}{5}c ] To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

183. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c + 14 - 14 ] [ -12 < \frac{6}{5}c ]

184. Multiply both sides by ( \frac{5}{6} ) to isolate ( c ): [ \frac{5}{6} \times (-12) < \frac{6}{5}c \times \frac{5}{6} ] [ -10 < c ]

To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

1. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c ] [ -12 < \frac{6}{5}c ]

2. To isolate ( c ), multiply both sides by ( \frac{5}{6} ) (the reciprocal of ( \frac{6}{5} )): [ \frac{5}{6} \cdot (-12) < \frac{5}{6} \cdot \frac{6}{5}c ] \To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

3. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c + 14 - 14 ] [ -12 < \frac{6}{5}c ]

4. Multiply both sides by ( \frac{5}{6} ) to isolate ( c ): [ \frac{5}{6} \times (-12) < \frac{6}{5}c \times \frac{5}{6} ] [ -10 < c ]

SoTo solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

1. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c ] [ -12 < \frac{6}{5}c ]

2. To isolate ( c ), multiply both sides by ( \frac{5}{6} ) (the reciprocal of ( \frac{6}{5} )): [ \frac{5}{6} \cdot (-12) < \frac{5}{6} \cdot \frac{6}{5}c ] [To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

3. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c + 14 - 14 ] [ -12 < \frac{6}{5}c ]

4. Multiply both sides by ( \frac{5}{6} ) to isolate ( c ): [ \frac{5}{6} \times (-12) < \frac{6}{5}c \times \frac{5}{6} ] [ -10 < c ]

So, theTo solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

1. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c ] [ -12 < \frac{6}{5}c ]

2. To isolate ( c ), multiply both sides by ( \frac{5}{6} ) (the reciprocal of ( \frac{6}{5} )): [ \frac{5}{6} \cdot (-12) < \frac{5}{6} \cdot \frac{6}{5}c ] [ -To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

3. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c + 14 - 14 ] [ -12 < \frac{6}{5}c ]

4. Multiply both sides by ( \frac{5}{6} ) to isolate ( c ): [ \frac{5}{6} \times (-12) < \frac{6}{5}c \times \frac{5}{6} ] [ -10 < c ]

So, the solutionTo solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

1. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c ] [ -12 < \frac{6}{5}c ]

2. To isolate ( c ), multiply both sides by ( \frac{5}{6} ) (the reciprocal of ( \frac{6}{5} )): [ \frac{5}{6} \cdot (-12) < \frac{5}{6} \cdot \frac{6}{5}c ] [ -10 <To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

3. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c + 14 - 14 ] [ -12 < \frac{6}{5}c ]

4. Multiply both sides by ( \frac{5}{6} ) to isolate ( c ): [ \frac{5}{6} \times (-12) < \frac{6}{5}c \times \frac{5}{6} ] [ -10 < c ]

So, the solution toTo solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

1. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c ] [ -12 < \frac{6}{5}c ]

2. To isolate ( c ), multiply both sides by ( \frac{5}{6} ) (the reciprocal of ( \frac{6}{5} )): [ \frac{5}{6} \cdot (-12) < \frac{5}{6} \cdot \frac{6}{5}c ] [ -10 < cTo solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

3. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c + 14 - 14 ] [ -12 < \frac{6}{5}c ]

4. Multiply both sides by ( \frac{5}{6} ) to isolate ( c ): [ \frac{5}{6} \times (-12) < \frac{6}{5}c \times \frac{5}{6} ] [ -10 < c ]

So, the solution to the inequalityTo solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

1. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c ] [ -12 < \frac{6}{5}c ]

2. To isolate ( c ), multiply both sides by ( \frac{5}{6} ) (the reciprocal of ( \frac{6}{5} )): [ \frac{5}{6} \cdot (-12) < \frac{5}{6} \cdot \frac{6}{5}c ] [ -10 < c \To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

3. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c + 14 - 14 ] [ -12 < \frac{6}{5}c ]

4. Multiply both sides by ( \frac{5}{6} ) to isolate ( c ): [ \frac{5}{6} \times (-12) < \frac{6}{5}c \times \frac{5}{6} ] [ -10 < c ]

So, the solution to the inequality is (To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

1. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c ] [ -12 < \frac{6}{5}c ]

2. To isolate ( c ), multiply both sides by ( \frac{5}{6} ) (the reciprocal of ( \frac{6}{5} )): [ \frac{5}{6} \cdot (-12) < \frac{5}{6} \cdot \frac{6}{5}c ] [ -10 < c ]

To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

1. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c + 14 - 14 ] [ -12 < \frac{6}{5}c ]

2. Multiply both sides by ( \frac{5}{6} ) to isolate ( c ): [ \frac{5}{6} \times (-12) < \frac{6}{5}c \times \frac{5}{6} ] [ -10 < c ]

So, the solution to the inequality is ( cTo solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

1. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c ] [ -12 < \frac{6}{5}c ]

2. To isolate ( c ), multiply both sides by ( \frac{5}{6} ) (the reciprocal of ( \frac{6}{5} )): [ \frac{5}{6} \cdot (-12) < \frac{5}{6} \cdot \frac{6}{5}c ] [ -10 < c ]

So,To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

1. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c + 14 - 14 ] [ -12 < \frac{6}{5}c ]

2. Multiply both sides by ( \frac{5}{6} ) to isolate ( c ): [ \frac{5}{6} \times (-12) < \frac{6}{5}c \times \frac{5}{6} ] [ -10 < c ]

So, the solution to the inequality is ( c >To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

1. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c ] [ -12 < \frac{6}{5}c ]

2. To isolate ( c ), multiply both sides by ( \frac{5}{6} ) (the reciprocal of ( \frac{6}{5} )): [ \frac{5}{6} \cdot (-12) < \frac{5}{6} \cdot \frac{6}{5}c ] [ -10 < c ]

So, theTo solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

1. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c + 14 - 14 ] [ -12 < \frac{6}{5}c ]

2. Multiply both sides by ( \frac{5}{6} ) to isolate ( c ): [ \frac{5}{6} \times (-12) < \frac{6}{5}c \times \frac{5}{6} ] [ -10 < c ]

So, the solution to the inequality is ( c > -To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

1. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c ] [ -12 < \frac{6}{5}c ]

2. To isolate ( c ), multiply both sides by ( \frac{5}{6} ) (the reciprocal of ( \frac{6}{5} )): [ \frac{5}{6} \cdot (-12) < \frac{5}{6} \cdot \frac{6}{5}c ] [ -10 < c ]

So, the solutionTo solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

1. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c + 14 - 14 ] [ -12 < \frac{6}{5}c ]

2. Multiply both sides by ( \frac{5}{6} ) to isolate ( c ): [ \frac{5}{6} \times (-12) < \frac{6}{5}c \times \frac{5}{6} ] [ -10 < c ]

So, the solution to the inequality is ( c > -10To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

1. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c ] [ -12 < \frac{6}{5}c ]

2. To isolate ( c ), multiply both sides by ( \frac{5}{6} ) (the reciprocal of ( \frac{6}{5} )): [ \frac{5}{6} \cdot (-12) < \frac{5}{6} \cdot \frac{6}{5}c ] [ -10 < c ]

So, the solution toTo solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

1. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c + 14 - 14 ] [ -12 < \frac{6}{5}c ]

2. Multiply both sides by ( \frac{5}{6} ) to isolate ( c ): [ \frac{5}{6} \times (-12) < \frac{6}{5}c \times \frac{5}{6} ] [ -10 < c ]

So, the solution to the inequality is ( c > -10 \To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

1. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c ] [ -12 < \frac{6}{5}c ]

2. To isolate ( c ), multiply both sides by ( \frac{5}{6} ) (the reciprocal of ( \frac{6}{5} )): [ \frac{5}{6} \cdot (-12) < \frac{5}{6} \cdot \frac{6}{5}c ] [ -10 < c ]

So, the solution to theTo solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

1. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c + 14 - 14 ] [ -12 < \frac{6}{5}c ]

2. Multiply both sides by ( \frac{5}{6} ) to isolate ( c ): [ \frac{5}{6} \times (-12) < \frac{6}{5}c \times \frac{5}{6} ] [ -10 < c ]

So, the solution to the inequality is ( c > -10 ).To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

1. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c ] [ -12 < \frac{6}{5}c ]

2. To isolate ( c ), multiply both sides by ( \frac{5}{6} ) (the reciprocal of ( \frac{6}{5} )): [ \frac{5}{6} \cdot (-12) < \frac{5}{6} \cdot \frac{6}{5}c ] [ -10 < c ]

So, the solution to the inequalityTo solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

1. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c + 14 - 14 ] [ -12 < \frac{6}{5}c ]

2. Multiply both sides by ( \frac{5}{6} ) to isolate ( c ): [ \frac{5}{6} \times (-12) < \frac{6}{5}c \times \frac{5}{6} ] [ -10 < c ]

So, the solution to the inequality is ( c > -10 ).To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

1. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c ] [ -12 < \frac{6}{5}c ]

2. To isolate ( c ), multiply both sides by ( \frac{5}{6} ) (the reciprocal of ( \frac{6}{5} )): [ \frac{5}{6} \cdot (-12) < \frac{5}{6} \cdot \frac{6}{5}c ] [ -10 < c ]

So, the solution to the inequality isTo solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

1. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c + 14 - 14 ] [ -12 < \frac{6}{5}c ]

2. Multiply both sides by ( \frac{5}{6} ) to isolate ( c ): [ \frac{5}{6} \times (-12) < \frac{6}{5}c \times \frac{5}{6} ] [ -10 < c ]

So, the solution to the inequality is ( c > -10 ).To solve the inequality ( 2 < \frac{6}{5}c + 14 ), follow these steps:

1. Subtract 14 from both sides of the inequality: [ 2 - 14 < \frac{6}{5}c ] [ -12 < \frac{6}{5}c ]

2. To isolate ( c ), multiply both sides by ( \frac{5}{6} ) (the reciprocal of ( \frac{6}{5} )): [ \frac{5}{6} \cdot (-12) < \frac{5}{6} \cdot \frac{6}{5}c ] [ -10 < c ]

So, the solution to the inequality is ( c > -10 ).